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The Method To Adjust Display Scale Settings In Hom

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  1. Although it isn't required, you could need to restart the computer to ensure the setting applies correctly for all supported applications. For instance, we now have to attract a butterfly on a piece of paper so as to research its parts. Since the butterfly is small in size, we would favor to scale it up, as shown under.
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  3. In this how-to guide, I will clarify how to change the size settings on a desktop monitor or laptop display. If elements are too small and text too onerous to read, you probably want to adjust the size settings. Find comparable words to scaling utilizing the buttons below. All content on this web site, together with dictionary, thesaurus, literature, geography, and different reference information is for informational functions solely. This information should not be thought of complete, updated, and isn't supposed for use in place of a go to, consultation, or advice of a authorized, medical, or any other professional.
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  7. Scale issue, on the opposite hand, is a number by which all of the components of an object are multiplied to have the ability to create an enlarged or reduced figure. Scale and scale issue are principally utilized in blueprints which would possibly be used for the construction of buildings. Once you complete the steps, the new scale configuration will apply.
  8. Scaling is used when the dimensions of any geometrical determine or form or an object may be modified with respect to its original size. When things are too large, we use scale factors to calculate smaller measurements. When things are too small, we use scale factors to calculate bigger measurements. Scale factor, on the other hand, is a quantity that is used to extend or lower the dimensions of a determine.
  9.  Scaling in geometry means that we are either enlarging or shrinking figures in order that they keep their fundamental shape. Scale is the ratio to symbolize the relation between the scale of a model or scaled figure and the corresponding dimensions of the actual determine or an object. Once you complete the steps, the model new scale configuration will apply. When things are too small, we use scale components to calculate bigger measurements.
  10.  What Is A Scale Factor
  11. The scale issue may be calculated if the size of the original figure and the scale of the increased or decreased figures are known. You should be questioning what does scaling mean in Math? Scaling is a procedure via which we draw an object that's proportional to the precise measurement of the item. Scaling in geometry signifies that we're either enlarging or shrinking figures in order that they retain their fundamental shape. When we scale figures, they are generally known as related figures. For instance, should you do not have good eyesight, making the elements larger on the display could make things simpler to see and use, avoiding stressing your eyes.
  12. scaling and polishing price Singapore " 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Mmv7QrIyPhDI2z9jDqJmoAhHi3ScM4HDpzX1atUkqVHu81SfRK3fStAUrpmUtrkeMhYBJSSo7j7Ghkl7Ty0ZtfzBJVwl3kBNTUo57RWR/YQR7XrAPdv+8R35mrkjLdxnH6B6vn6T1CqKfmbjdEuDlCmnf89NTjbaQCI6O+cHsa+S3Lc7s+SgfLLH+EG7IV9qn+nXev8AicXKY/X8xGZv2qykiZMuqdoJSpCzzVWRedRqUks3+7t7jkhThz/ZTs27HWstmC6nHqexr88logttJ2pPuATVLYR+34l/6kqedxCN51YtC0jU1yQc4GXVZNKGs7Nra/MlMbqZqy3OqHCrfdlt4/d61rikRmyS8MkfQUImsRHj4YwATwfWh36bXZ8wEKpzrKm7k/zONOo874n+mDarn/K3q68WUqIMlM9fiR/bxB7fWkiH8QfWl4JKuq+qUhXvcFV1h1/Bg9KNULZISkWp1alY/dXG/THoh1Q1/aWL7FtzFstjrYLUmcSkuj3CByfvSW2pqXNQHdqa7puZVdT336H4jYjrt1lBCf5WNTqB45nqota+uXV9TpQ/1P1ItX9Kcqhc74eupFsAcYXBuKUjktK2KH2B70tXaxaq0w4FXqxSYuCMqU0Sk/ZQoB3ZTpgRH+McW+v4CCf7TUH+tHVpTKQnqVqFCjxn51VWoHWbqo6hIX1Iv6iB3MxVZcu5ofjNLCsKzjANT2S6jxAw6U5KuMV4MS2hLTiV9nd2j8TVFdX+qahtR1E1Bn3+cVXsdXeqjaUqPUS/nPvMVSshkqRvSkEEZyKhLbnYir1JB0YE1Nb+BG/+V/qorkdRb8Bn/wDuKqJfVzqsfIjqNqAHvn5xVK7PlOSOx7V+VgrUEn1yc0VXrcGsx1X2hxzq51dSCP5SdRge/wA6qtB+G3qZ1L1F1ntNpv2tb1Ptyo0tS48iUVIWpLSik4+h5rG31BKCg98VpPwrIJ622dXbEaaMZ/5E1eUHtBLa17CdRV6xtl3qxrJxnGU3uSlX33felaO0ELSVZOBTH1hStrq7rRxspyb1J/0vagsLc4kKd7+9d9U6APtG2OnZWrL7/wDU9oYD5IAwc1bbiKbRtHNfYySOSgD6+9XY7TjoIAPPH255P9VdDFtn6SbWdg3IoTBdUWwNxHOMc0y2nTvjjxHyvak5CMd6dNR2m1F7TdhsD3z6bNEUpd0bSlKZaHjuCFpHIWg+WjNpsbDDiFvJBwQdijwfvTKrGX4Qx8jfH8TNZHUrbt6GouwrLGTy2zj6BPNG41omLKSwyoJP0p1jRIiVFbUVoKV3CRwBVxCW2zyglPqAKaVUAaIAia+9m52dxPY05KccS2gOLdcI2oSCSf3CmRnpnfC/HE63qgJlKCUOTMIH789qY7Vru76ciuQdNWe1RpL/AB+kJDZceA9gPynH1oTMfvFzfXKvd3l3F9wALW6rAIHYAdgKsRbGJ7tBfyYHZYSQqqfuf+P7w290xh2GdGgXbV+n47jyVLUEunchsDvzwaIaesPTQXS4xb9qRb0GI0DEkRndiXieTgjuR7UoJgR1DeqKklR5J5NezGSxw2gNp7pSOQmp14zOhV3Pj241KwbFbfH7cmXZ/gWyc+7p2WZEJKdra3UedxpX7Ks+oI70NausWQja2+FLaVtWPUGrHieJlpSe471nOpFqs2o/m4T+0lSWn21nyrSf9tD9WzR02oW62vv9Yb07G9c+mfM06NIUohW8HPAq8lfIKTmkvTtwVcEulbyVBK97a2+D/wA0inGIrJR5twCe/vVGL1RMkdwnr8IoOYVhTVDPHYYxVgvgKCydhBBB9jULCEgJUEbtxqypvcUqU3Tau1XG/rF7VERpjazRKjxWr5bmpkiMtPhyTxlHruSKq6ktMOZIcvdlfZlwpXDzaQEqYV9vagjTCijcPTtVuE+uO4lxKwhXY4Hf/fQf6RKX76Trzx7c+f2kXY2D4vMFSLIy6nDCkKIABSR+b3FBZ+j7Y64XkRlNnADgQTtV9COxp9bQzcJrTDjzUNLmcvYwkHvzUV1gxoEhTMK5JkpTgFSQClVWmyu1vTtGzIJbZUO5W1EGw6Ot2nnFvWmO3FLqgXA2gIC+fXHetDsmoHLeGEIhxJLAcDhLqPNnHIBoDISlpC3FnsCon2oHar2+WltqUn9WdwTn0NVW141YGOBoGWk25e7rG2frHeVcVSpUiV8s1HS8r/BN/kAAxx/n+9QeMlw5QMYGOPahsKWZCRuAIIz3oihCQgEDFXIiIulgjVckz6SEpKs4x61CV+KdxIJ7ZNTraUps4TkGo0Mpxgt/21YDxueVNeZ5TlIUcjtVOSGicqIyfT3q4tlSkkEGh8hpOQOcg13uG53t3Kb6QlJ2gAZqhLAWN6VHA9M1PdZDMOO47IfDLaBlS1HygUIcnM+CSiSlYUgKBB4ware+vu7SeZaKTrepDKiGRCdAI37gU5981hL3wzaTvGs5upbncLgYcl9Uh22heGluep3d8Z5x9a3du5NMhCm2Q6UnKkk/m/8ACr7DET5dSnoqVeMsKcSDxjOSke1DWdPq6g4Zue2EVdQyOmowoOiRMrX0u0OIvysXTEAMtpwE+ByD75NCf5NdO22QX7VbkxX1ILaijsUn0x2roC96okXtthp6BDjsxMpaDSeSjGAFcc0AdFnKNr8EKyc7k8EVNOk1V6sC9rfvKj1nKYaLkg+Zzfr3pLL1BPauMGS3FZjoQ2iOAQhO3kqz7ml3W/T64wtLN38lE1FvWlqQ+g4UySfJ5TyoGuqrZB0/ebu1aZVxZtUZ8LzIkfkQQOBz6nNLWrdFMw0Pcx5kVSyhqRGO5p3b6+w+maDtwlXuTeyef2jPG/qGxXUOQQPb3nE0q4SkSlKntqDiFEbCMYrw1NcmkvqAQBwE+4ra9bdOYVwXLkR8NS3E85HlzWPOaTvunlqi3BsrK0khaRlOPSlWzWSHmwxM/HzBtfMqKklkDZyD/nr8JSZrIiSFqbYKvOR3zQ12Qph3wnEK3J7jHANRsSCt0unJTn24qxbNiFMg1xPNwYjxpK22OWj2Uf2hQafbWXEAuPJ2r4wB2o9ObclHKvLt5GOKpyIYW2l9Ck4HC017Q1swexDrzOsfwlrd8j1z1cUr3JNgQASP+WrB/wAUi4T4vxk6kTEfcSPkIBwk+vhV0d+FcgJ61anIA5sKcn/71Yn+JTb2pPxe6mdcbCj8jAAOP+Spc7lLtiJLcf17vTM4/t+tNU29YX4q3Ej9lYzWg2TqzdEtoL9sKynAPfFDmbJHUgEtJyB7VbiwPATt8MH91eFx8y5ek1t8wj1b+tMdoJTKhOo5HKR2+tPkTqpp1SG/AurbilAfmBSQT6ViBjJUP1iO3sKglwYhZKiCV4yPSr0yH+s9kdMr0AJ0kNcsONgtSELBH7Kq+tajS+v9W4kqV2TnlR9q5DuF7ulnkJNvnPN/QqyK3D4WXrzr3VMqVeGw5EsrQcC8f4R0nAFWXZLIoLftF74go5E6Q05pFyQWpdzbKnCkKDJ/Kn71plrszDAQpRUogDCB2FUbYnKQ2e5HJxij8XygH0qNdXPefMAssLDUvQWmkqJCAPbjFFGUpHKgeO3PahrKXR5k8VfjqccwkoApjUe3zBGIhFNwnts+DGmLaB/MpJwcf7Koqt8WS8ZEkmS96uPKKj/bVtEUEAlJ/rqREY8jbxRRsKne5QVRvmUb/Mjjxm0HybRj8vA4/sqRbOzkEBX0/wD3VhEYhGEo5NSKyPKoDIHPFeFx9jOAD2lPKXUrZfwdwOPvS/ZIqGZku1hGFNHxEhPYg9zR0j9cOffNCxJ+Q1MwoIG1/Laye/NA59mmW0nxC6BwVjPEClpTtA44VRJuMV+dBqnEQW1lrABBwRRlhtIA2jvUkcnmVPXoykYign+0V8SytslQJAIxgGipZUlXbIr4qOlZ5Tj6UWl2uIO9Zn6zXN2GlyM5GYlRnUlLkd7gE/zkkflNEYjUeSW1InwI8dpSglqUsqWP6OR3FCFt7NwKO3Y1Cra7wtAz7irGpWwkqdf+/EqK6HiGNSC3qbilySy9cFDDi4y/1RQOw55zSZqO9OWmfakqaAQ6fCX5vQ9qJvLS2n9kYOaS9bkz7jaUN+OXESEubkDICfr9KpzScSgdp54/mW4dAdzsaEckSQtexGCAT3ogxuyAQc/Wg1uYK1LdWokpVxjtTIwlOQrGcjNXo7EcmVWpo6E+KacI5qs/FOfKSaKEZx5ckivojkgr2V42akRXqByhSW8EEmq7gUkeZQo04ylaDuTjFDpbASCSnt/bUO4gczoBHmBJ+4HcjnNCpKkhsBSRuUrOcc0XnPIZaPbj0pFvV5Wh1LTDgLqzhI/21RdlpSOYZj0G06EKXOHbb5F/QkmM1KQ75HEOpCkFHsQeDRGDo6wSlGJdNRLtEdhKUs/Lxg4D6YAPYYqnaovy7PzDpy6rlR+tXFfMbdwT9s+lFUUpYhduCfzKbnsVgqngSy90hgz0qTYOoNqe8PGPnB4av3hNCZ3RTVipZtbardelBtLi0sPAo2k45SrvU8iEp5O95tJJ5Ix3+9Uf75hOLfgyX4roGAtlwpV/+qGsw1Y6Ztj6Ef8ARkhkWqO5Rz9iRuYp1B6AaauE+S18g/Ybsz/8pJSkk+pQeCPqKyOB0a1HpydIfukhiVHJPhrZByfuD2rs+46kk6ntohauYD9wiJ3W65MnY5u7Ft4dikj1HNJt60rMbS5IQG1oKd21H+6lN/SK1PcvBH08TQdO/qPMVPTs8ff2nPKGFRkeAfyp4r4Gm1A4JOf6qfb/AKfjR20znNqXlLUl2MEEKRj9r6g0nXOPHaa3RQQVGgrKCg2ZosXMF3iBn2ikKUjjFQtlIWSU5zVo7nAoK44xVRH5yn2qkN2txDm2ymeH2islXH0rSvhZQW+t1nB9Ys3/AFJrNJBWhJIVWl/C24VdbrKVkf8Ass0f/hNEd+xuBXofTMUesMdtXV7WLgUdwvUn/SoFETtA82R7Uf6upKerOs/Ko/8ApuRj/GpeYcUEjJwfrXFOxqNqxqpdfQS+0haF7sjCucZpj09CL74zkIzxnvS7DCnHkgcjFO9qCGQ3tx3GMUXSAW4inPtIXtEebSyzGjBttIBxg8UXYUAtJzx60HtT6l+TGM880WaTvVgLANNsfSjmILRsw/CeST6iiG7Kcgmg8NJW6SQe2KMMJCsJxR6XBeDF9iHc87j2Uk4H0r2klRCQDknjPrV0Q2jgqUQPtXhDakSUpbSFNgnKq82QF8SAQkz2w0pWCrgdqkkNoW2UA8ipgE4JTiqr+UJKh3rqXjzICvncHrWY6klXpnnFIGrrep2/LS5JQBLbDiR+0FD1+1PMl0qICleves+vCWnNflxa3FL+UAA/Z2e2Pes//UeUP0oUDeyB+Y76TXu0t9BImZ0SxMM3C4TlwoxkITIWhWeQeMfQ+taLbb6z88u2Ny2VFSQtoqV+ZJ54P2rI9TxShssvsIeiqOVIUknB9CKqLg3x+N8hb3VrnMtJw2k4KEZ9D9jXzq/rdnTbuxBsccfz+Zpx06vLr7mOv/cTo6w3NuUksJadHOUrIyk4780wRlhQKUjn6+prI+mJuSZklidcJXz7RRmJgeEWikYKfrwc09XeVcUMNzAyUCO4CSlwAkfatn0rrrW4XrOuh9P2mZzumhLzWhjUEIThJUc+vtX0tBIzgf7KitU5u4REPtoX253jGfqKtqCdhzxWvxsn16w48GZ+yjsYrIjgpwo8d8HtUS9iBkAJT7CvklWABu4A4oTKuAT5U5x2JorY1smDCnZ7dT9eJCERHlbgBjBJ9BWb2S8Pv6nmRdqfBH5dqefpmmPUUx6UlVvZx5+FHOMUg2hxy332eEMuPOrcAK0K/KKxvW+p/wD5SemeBNJ0/AUYzd3mbHalnHnSRTGyBsxjPFL1iCvBQF/mKRke1MTQISNoz9q0lV3qIGiO6vtM+rUAnaKiKgPWqN2u/wAtdGLUzFK3JGACTwPeiBYCGuASR3quvKFpIXnXE61PYAGkD76UNFROAO5JoU9JaUkuKcT/AEa9XRavmCUkK2t4Iz5f/wB0u3S5fKpbQ68w3vH5VKAJP0oO3qQq2x4Al1OH6pAWDdVylraEFl5kOP8AO10BScfUUFfl/LoCdrO8JwUo4BP0HtS9JuceTfRJVJcUtKiFlSMAY7Cvsu4MJcMt5Z78beSeaz9HVBZa1rcc6HMdNglFCDxG+0sOyQlb+0KHCto7ij/hglI5ASMfeqFkWhcUP9y4AoHGPSi7aPEKfTit7gv2puZfLUWOfaRCAH0lSiRs7exqtKi9iO474oycpRgdvtVZ9A4ORj7Ve793vA1QjiKVziNr8hRuHsRkVG0XG4htyX3ERyreWR+TcPUD0pglxm1/s4+poa7ETuJzjAqs/Fx7SwBQN6i3ctOQZjZUkFDgHCu+fvWe6h0u6ltbclhKkfzgO4rWXk7OMcUDuiUvBSDhWfSlV+OrHZhdNrD5eJz3/JRY77ejCn6gRZmJQKhKdTlDSh2T+/tSlqrphK0de5EBx1brDiQuC62NyXhjJ5HGa3a+WVpaXClIKTnII4zQe23G7hcXSaW47qZMk+AuSNxQcchJ78j0qujGquK1Dhvr9Y5p6vkUktc3cNePpMVkWB11DVsU7skORxIStQ42UDlxDbXVRHUhRTjepI7/AFFahq6JDdvaJ7aHGvkFLaEfkA88jkZxn0rPr0LlOmlUxhLflOwJwPL/ALaFyK+1uB7n8TQYlxuJB8cfmdUfhdpT/LXqh0JIBsaQPb/C1j34jKkD4tNShSc/3nB9P+TNbb+GFEWz1e1EtSshdkHb/paxP8RgD/ytNSk+sOD6/wDJ0oyDqw6kawP1h/ac4tuNkjA4qVxzw/YA9qgKUbc5xn61QmzUNHao5x2qtNg8xkVEtPTvCBBIz680vXO9uJKthwMcVWuVwK1/q85+9AXXlOKIUCMUaigHZlVrAjQ8yK5SXZq954HY11P8Dt7tQbvum3Sj9JOrRKbSeCpA4OPeuVVp8vlBzRvQV31ZpvVMG+aQYluTojgKQw2pW4E8g7fQ0Pl2AAMPIIMW3UdxPd7if1JYcR4eUj1yD6kUagqSoJAVnI7UkacvrtytEebOjJjyXGULfaKuULI5FH7ZcWm3QsLSRnGM84otMpGQPvzM2cd1JXXiOTCcgAVdYYKTvz2PaqUJxLiUrAwDRaKnnkeU1ato3uUsg3oy7H86ACOaspaRtCc81+YSE4CBkY5qdtoqAOMHNXGw61KXQa3PKEhJweAKgkNI5NESwnBVtyageR5Py8DvXlc6lK+YvPktPnPYnjFA9RPBmdFeCCVBxOOPrTRKZb3bgn1pE1rcVRb3Z44TxIlBB+vBNBdVs7KefqP5jLETubU0iBJLrocUPzgGj0QFYA285pbhKShTSUHI2g8elNMfZtSRjmi8caUblFvzSyGsnknNeVMjcOTVtO1SPQ/ao3EgJzijQvvBWs0dGUXB5yPYUHmO+GoqB5ozJyhOU96CTwkoKjwferAxWdQAmUFy333sKAAzgfT71mui+penNd631BY7LPD8nT7qY8n+bn+ifX/wqv1+6nNdM9CzZTDiRc7glUSIndhW9QxkD6D1rkP4TtWS9I9co8CX+tTqJKmZSieVOZKgT+8ms3n5j3XKp+VT/n6TV4HR/UwbcrXI8T+k9tjbIqCrIKjkjHajTLQ8MEJ4I71RgEKTgkehos2nckAfatJ26GxMa50eZO2wEICgMmpExyRnOPpUqB+zXtZKU5HpVQYkytm1BsplIBwrtQecrw0KJ5GKLyFLII+tL12ktlTjJUDhPoak5IXiTpUvwYrXyRlCiThHbvSRa1OXi++I8wW0NA8H1H3q51P1jbNI6bfud0KwwghGEDKlknAwO571b0lFU7bmpgQQt9pCwMchJANZuyw5OatC8heT+8frX6GMHPHdGQDKAhCc/Qe9W48UbgtxRyRyDVNlDqlcLok0hwJ/MM/WtP6mlAERWLvieXmATke1Dn4aV5UrI+1GVtHZu3jNUnmyVkrOQR/VXRYG53OLxAT0TYQU8/7a+NK2nbyCOKvy0qSU7CNvtQuWVeGpQzxXSQBsy9dGA9RWiLJS660EIkLQUb1DPFYjqiyOwH1fq9oAOeO5962SfLdQ4dx3ZHqaV9Qx4tzYPijDuCBxSXMUONiOcDINTb3MUdUEoI5zmqYwVlWSOOKK3u2u2yYrcCkEk4NBi+haiAoZ+tJQdHRmtqv9RR2yCS64ojeAB/nrUfhZSP5cLMvH/wANN/1JrLJDrefNgn71qXwsOKV1wsmwYSYs3P8A2Jq4HYnsj/6mi51fKz1a1huGR+mZGP8AGpYO0I3FRFM/WN1Keq+r/peZH+lSgpbqk7kp4HvUxL1s1SDvwBCsGS20U7jwcJPpT3bPDMdDbIwUDI3d6zqAlsByZIs8qe2lpQQ2y5t2O54UffFNlhuq3mIzyo0lpaUJC0LRyFeo+1FVutfO4tyh36HmP1olkFIWtKcHnJpjiKQ6oeG4gn2JpLdbucKwxNXrhINnnS1QUSQoEofAyUKT3HajVrucaRDKkJCH2zg8d6Itylp13e8XKgt3286jiA7vb8JYSM+b6UehqBAUFj68Un2q7IfZC9wx2UPUGjVouylvmOho+GBnfmhx1BdjnzIPinR4jEp3Ctq1DaRxzzUEd6Qh1zxC2lpOAkZ85+tQOuvHBVjtngc15enQ0bUSFLDqhgAg5Jrl+WUOwZUlHsYTblt5CUjOaimPlJwUYSexz3qKIv8AVgoaPnHIyMgV6ktLWlKkLCkI7j1q+vLNgHPMh6AXiCZmVnyDKSKR7iFytbR0NhSVIaytzsDj0p8lLbOG0qAPr70Hh2pkSH57ygtbhygEcpxQfWFe2pU+4P4huAwpLN76lKVGAda8RkKSVeoyU0ZuNtQ6WiIu9AbJKmhhX2OKg3wngUSCpCVHBWDgg0yxpTbdndmw0l1LbSijYCSsgf76RnER+7f/AGYcuQ6FQPrBvSlSXpUl6QhS3wNgWr+aM4H7q0K72/562LZ2oVxuIP3rO+mV1dQlciZCDLUjLiAU4Uk5Oea1KI9Hkx1KbOMnByMGmH9PUJb0/wBE/f8AzF/VGevK9QyOzgiGlnaEoRwgAdhVpw5Sa9oC0jACPL7H0qNwHk+hrZYiNVUEX2iF3LMWlGYvKUgD0pbuLxYClE4Ao9NKgoYGfalK9OjJDh2j0B9aG6jkfpqi5MIoQO4AlIblupbI3LcP5vrQi12xy0dQZSH1pUzPYDrSPUY70Rtk6K/cEBbh2oPISKJuMNXC9NTEYbcikBKj+0k+lYytVyrKyT4bcdWk1IV9tRxtsfbhxHb1FHY7aQAVDdxmh8NJCe4IwO32orGKVp4OPTmt+Kgi6mXtffieEQYbay6iOkLJzuIyR++o5fhtJKiCEjuQatqGODg0OuLwZjuKIzgHINQ7VRSyjUghZyNmJOq9QW+zvpeWSsLUErSk5Iz2NY51FD0m/wD6QW8r5eOgLbSV4SCr1p+1jcLXNtzsf5ltMh1eF+XlsCs+ntpltCEt1tfpvUfSvmfWb3yrjUDwDsam36dUtAD69oOgqM8BSUK5OFKzkUTQtDk+Nb40dbp3BHH+c/SpoTEeMw3Ejo8ucE+/1qxp2NGb1O00XSohKlcD1+9RxMY+qiD3I3Lcu4CliJoEJhTDaWG+SnGVe5x/mouwhaSkFZz9qpxW1FW30/McdxV9KHABlOPb7V9Lrs7VCj2mGsUMdy5gqRjOKrSU7TgH1zVgfq0krPl25z9aqSXErAKTkmuNk64kFqBO5Sd8RxKjtwBzVN8HBJUDxVx3yI2pWSBQyUVAFSe9TGUVEkKdnUGTXFpTk9jS7OXtClIUDReY6pSA2o880EfCfMCQMcHPvURkeoeZMU9oguaQtJStOcikzUMB2Sy4Yj7jLyQS04g4U2schQpqnuBCuT6elBHkKcWBk4Ucd6EtBALodEeDLFA7tEbEBaY6xaZ1/ok9OepMR2LrW3SwIN2Q0kIuLe7BQ4f2VAGgEvTsKe85DTCWytKygLeSRtx/vrMNTpejavuRaUW1JkFST7KB710radc6e6v6XtlpsdkmQLtZYQ/T7i2fM8QMJWkj+umWGU6lR6p+c/MB9dfN+3/MbZNZ6RcETfpsNgn2J9po/wCHbbVW7rBqFBCcJtO3KTx/hBXOv4jTYPxW6lUef7zhf6uuyvg0sUSz9Q5jcUFYNrIDxZLZWN3qPeuMfxG3w38WOpULT5fkoP8Aq6zvVqvQyighvSr/AF7S5+hnMEp5bKTk9xQCbKcWvfxsT70dnPsrbCUIwAO5pUnKLjgbbGU7s8dzVG1ReY7di3yypJlF9wjI/dRbTeh9SarkpjWa2uu5ICnMYQke5NPvTfpL+lFtXfULRDSyFtMDgkf0q6Z0fpmLEjIYiRkMMtnlKQADSuzqD5D+lQNwS7ITFTbcmZf0++Fe0REJna0lruCzhQYZ4bT9/eugdM6U07Zm0QLLZ4UNsJ2bktAHA+tWGGUNjB7DjFW2F+G4F7cpNMKMA7DWnZiG7NsuPnUtG2oWkITx6ZoUwqZa5wDuFYVwSeFCjbUjasqUOCOK9ToTUuOcEBYGUn2NTz8VLK91jTCQxrGQ6Y7BjZpq7JlRAkLOUHkGmyDJUobcgj1NY9pm7O2u4eA75knyqJFadaZwWskHg9qpwMg2jtbyPMpy6PTbf1jjFUAkYOc81cbJwMJzmhUeQVYx/NwaIx3sAAH17U5XmK7PGxLuNiagdGEHJzmrBd45AxUHiNpV5jkUUiDUpJ3BsoICVHb2Fcz/ABC6jukDW+n27XMXHMaQhxwNqHmG7BBzxjGa6ZujiAw4sKACfMa4h63XNd31HcXfE8RZKmz/AERzjFIP6gOq0r9z/wATTf05QL7dt4nadmltSENuoICVpSRj6gU0RFZSEgVi/RfUTV76fWGYh0uAw0NKUTkgoykg/Xy1rkCalTaTimGBYttancUZlbVWsp+sYWD5cJGfevTv5ce9VGZYVgJOPepvGCjyRmnKrvxFhB3zK8lQQnBPale6zGY7bsiStLTDaStbijgISOSaY56/1RCRk1gHxCasCLK5peBIWiTKSRILSsFLXt++gOqZK4WObPeNulYjZl4rUcHzOc+q3xDWTUHUZyHc+n1t1PpmMw4xHRPJS644UqT4rSvQZII98VjOjZ1vgas0vc4KZEW4QLkgyVKXlJRv4A9exx+6ouodpuD15TJjxSltpIQnb+yBxXzQVpcm3NZWrDowUk98jn/ZWLfqDPj7byDufZk6HTj4jPWPK6/xP65Wl5uTHZktgBLzaHAfoUg0bYWhJTzmsv6PanTfdC2eWtYW4mOlhw55C0eXn+qtHae3FJ8vNb3HtXIoDr7ifB8uhqbWrb2MLBSQQQc5FRuO+Y5UftVTxk/z8fvqNyQgH82fevBADzBAu/MikygAcHHfilS5yWkLUpagFE8D1NFp8vuU44OaxzrbrcWGymHEcKbhcf1TJT3Qn9pVA5+T6NZK+fb9416dhtkXKgHHvMY6p3uRrjXLcZgOqtVtfDDOAfDW5u8xPoTXT+mWG2LM04FDztgDHpxzXLulhJ3wra+sqYYkF5IwNxcV+YmuqNPR/wD0XGbVko25BpF0ak122H3/AJj7rxChKhwANS/HjoG0k1c+XyOBUkVlsntx6Zq0UFPB9K0bAgd0ybN9IOWwW/zVWlgKHCccUQeypW4Dge9UniOSRwBUA2pIcwLIB3YFCZLgDS21dzRicpJIIoNLUlKCpWAO1ea4eJeixauLXmJcGAO1LNwIHmHAo7fbk0hRSgDA75pVmyd2RuGMZBzxVe+/gw6usjmK1/itT0OjbuKQccVlby0tyC2FgLCikg1qGo7zGtUVW0BTrgISM8mshuqFLKpYB3k7iKRZjKb9J7eZo+mixUJb+09zfES6nCs+mK1f4UZp/l0ssdSSD8rN+3+ANY6mat1kLI847g1rvwmq8brtZFL4UIk7t/0JqKNrgxlexapgYK6vILvVzWaAD/75k/6VCIVqUduUqIPpTj1Ntjyuq+r1ORnEFd4kKSVJIyCrgj3H1qtb4RThC+DTSqggfEOYnfNHaADPtjtAbcQ7HBRg4V7GmlqKVIW0VBKV/mCUjn99UYxU0nalKQPeiTDh3ZV9KZ0Y6VjxzF1lxtaBNSQr/N+TYF5uUq2QnA6i0qfPyzbnq6lA/aIyCangzWfGdJjuR21HdsKiop+mfWi8hguIK23FAkEeXvQXwn4byy/vewkpIKsE5+tJOs0EsbVPBjTBcBe3Q87jNZ30Rkb0ISpDnPPcmmuzJZWpD6UgEZJSB2NIttdY8NIHib0nG080dt06SxI2qSUA8gZ70hrtFYBaG2qX3qaFGksLwpwFJHGPWpJC23FfMiPvLKSUkp7fal6FLWHEyFNndj8m7n6H7UaYlJlqQWlpDafzpI5zTdLBcpWLGT0zswW6yj59E1t19aZQyo9gjHpmrcRxp110+OVbBj82E4r1fitLDaAnckr859QmoIMFs7wkEsOJCRlPNUV1WLkemg3JO6mruaTyxGDWUjjGdwpdlTHorqG0LwgDJNNEuI1GjBJ2pSOBSNe5iYrjkhbg2oycA0X1cNXUq+CZVgN6jkjwJYQr5tXy6FbkrPI9ab7e87brGG1qJUkYC0dx96R7AfmIQucckuoVk/an20SUyUgKCFhacLSfWgOn4/cWb3PEuzLtaA9oyaetkVqExiMlKXcuJSEjAJ9aYYDMppLqZL4cBGE7eMChNvdQ2ylDQCQjgJHYfSi0eQFDzr+tbLExKkRQByIivyXYnctojoaIWlagCMYPrX6QfDSSRxjivC5LSwADVSXOQEqQpXamaKEBMDNzHgQTd5ZQ0SeCKz/Ul4ShRUXPyJyMnsaOarvqIiFJJB3Djmsuny3p1wabW4Q2twBR+lYHruUcq/8AToeBNF06n0k9VxyZoulWFtxEvPoG5/zlR74qeFJjG7ORXHSkpUFZFD3HzBhh5ErG1BCAo8Z9KVbJf3BeHHbg9lb52hQ7ZpKblw7ah94a1ZyKnO5v8ZwhtO1QPA/qq+l5KU+UEH1zStZ7olyM2krA2pxRdEtKxwvJr6wurUBH0mKZWVtGFFy/LyQaEXV5LjS08HcnHevzksJTt9/WhFwmbUHnvVNoVUMnUG7uJm+poKIisN5XvKipZzgfTmszYeXcdRyW20L8GKAlSwcZP1rVtZSUCI42txKd5AHPekNxpuJGekp2t7k847GvmvUcRKr+1P8A25sMHINlWzL9oeDj/hgpIScZPpRrTiGXLuvwk5UjKhgcppZ0w+l2Ip/eDzyRzk08aItqPHfmJbAWcJzmmHTqS+YqDwP+pVm2j0CfrHCHELCAo/mKefrRFCVKISQM454qNptxCckZwKsNDAClck9xWrdDWJmywPEpXSUiGEjaF8djQYtPLfW+lpUdZSNiye30xRx9kNLLzQGT5tquRVOS4pStxZGT3pVYpc97GXqdDUoOPlho+OCrYMlQ9aAyrqFLWlSClHoR2/ropdRI+XWlR5PGB60m3F15LmEKV5U8gChMrLeojniFY1Is4Miu+oYUNxbCd76gkEqTwBS2b3+kVF1DreEd0p7/AHqvenlvApbWjdnneP8AbS5FU8p7wkjCjnzIT6/egMbqF9l2rPEOsxK0r2PMY5DviKytfpnikzXut7ZpK2eeQFTn0lMdgHzq4/MR6AU1+O45aWYybYhE1DilOSy6VFxOOE7TwnH0rAOrmiNWy9RO6ogW9+4Rm4wL6mhksJHfKe5HrxTrOsdQEHykcmU9HppyLe6861zr6xXbW/LfXJkOq3vErUsnkkmnSxTda9O7qiW27ItxucbHiIX5JLCvTcOD9RWf226RXw2yZDZWpO5IJ5I+1PNp1c+xahpe+yHLhY1L3IjuErVGWf8AjGj3H2qeI7YxC1HR/wC//bmpzv8AWXkBl953h8BOvourNRO2tdvRHnwLapTy0vlZdBX3IPbmuPvxIsH4stSgDJ+Sg/6uuhPw4YSLf1z1PEYcecjixpW0t1soUUl0d81z1+JIrb8WWptv5jCg5/7M1VnZJzck2P543EuFjphZBrQ8a/nU5TuSwhtWMk+wot030o5ermifMZUthk+UEcE5oexCcucpuK15lOKxzW+aC0u3b4DLaEeYDnikvUrzr06/JjO6xaVJEadM2dCS2lA+wrUrXbRGipJRznJpZ09biwptZZ9e9aXbLaqXb5D65DbaYjQd2n/jeQMf20X0jC7T45mSzsk2NowQlhSldjxVhphSQke59a9BaQoKSnj2qdCs7V4xR9uQKtjc9VT9J9SySrOP6qmaV4SwjacE81+QraAuvTu4p3pTQq5YtOoT6RUbgLUqDbwm7x08I8yh9M056R1BGnw2JbDiVJV6jtmgNwjKkQloOFbhjB+3NYvoPqxb9G6vn6HvM8MxjLUI7jn7BUexP+ak99rdPyRd/sbzDqMY59TIvzDmdhwZqXCnPbFGWJKduf6qzq03cLQhwOApUAQQcgg9jTJDuAWBl2tNj5AdRqZ6/HKsVbyI2fNhSQFev0qJ59CElZ7D0NCmZyCsHduI9M1TmXBaysBWMGj/AFQF7oOKeeJU1nf2YVllvZ2hLalZz9K/np1h1lLttxb+XWEqlrW6T39f/Gux+qd1eYsMp0r5c8iU/wCev58da5xXrIw0OlSGGUEA+me9Y7qtrZWSCfafQP6YRMZS2p1n8EGsnbtp29aakyy49b5QksoV+y256D6ZBrr2I/8AqUAdwa/nB8HesU6c6jG2OuIbYu8bwVbuMrTygf56/oDabmFIAUonceVE80w6JZ3Iaz7GLP6rxPRzS4HDDYjcxMKc89qlVcFJQVBQoCmanC8OVE/cmm2z+sT9SeK0y29gmV9DZ0Odz3fdTJt0ORMedTsYbKjuVjJHoPrXKGtNRqu1zkzZiwZUpRKU55SPRNaj1E1H+klCAwvewyTyP21VkUyPpp2G05HtR/Ta5Snpsx1W4hA4Q21/NT3KvcgVmc3u6jZ2k6UT6F/TvTkxVLuOTM9uumpEgOTDGCnSOAaX2rBNg3GPIYiKbXuG4J8vGa3fTWm7hq+7R7BZLeX5TqvMSdrbSeSVuK7BIx3qrI0+2xeV2u4PMs/Lv/LOvjDiEj/5iSPzDGDmp2dLArDexmsbq+gcc+3t9prPw+3RcOHNs769pSUvtJB9CAD/AJq3iJPUUjb6DBrl/Q01uy3tC4slD7ba1R/FbGEuN5/MB6eldA265oU0leeFDIozpFnZWaj7T5R1/GK3F1HmNPzXB4yagcmEY55NDxPbVzvqlJnoB37j3puX2piKuvnTSO63AJSsrXtSkFSiTwAO5rlbWmqk6x1RKuKXguHEPgRj3GB3I+5pu+JHrHG0jak6VhP/APpW8IKVBHJYj55WcdiewrBbFc23GExWm3G2wAG+54rN5OQt12x4X+Zuui9Ksx8b9S413eP2mp6TlNuXFBHmDSklXPIrq6xspNuikcDwwRn61yjoa2toebdx51gble+DXTumpqlQWkqPZISM1d0Wwd9hb3iT+oB6jgxraASfzA47VKAc5I4qmh1JG4Kx6cV6+cKRtPIFPnAZZlCpUz7II9KFS1FINW33dwyjj3FCrjJQBt3FOBmhWIHmWoOYLuD5bTn0HrSTqvUbcRgpTyTjGPWjV8uRabUA8B9VVn0tszZSlAqdBPGORSPLuct6VXkx1i1IPjbxFy43C9TpqleIpxtRwkDygD/bU8OHNSy4iXh4qRhHBG36/wD7poi2VqO0CrcF9+atmN4jCyhQKkjlPrimeD0xghLsSTI5GaO7xxMT1Hp1cX5h+QyqZIfUFJecXhbQ9gPalWdFBaKEt8Y54rZ9R2r5hCxxuPOBzWXXiK5DeUlTeUnOR7UuspCEqY2wssuAHMSX4buQUdvbFar8JIWOvdjCj/8ACTuw/wCQVSI6lJWE7cZ960X4U4ymuvljWSMfLT+3/QKqns7TxGFuR8JWN/UOHLf6lamkz5Lj5/SjyGyrshsHypH0FACwVPYSDhPanfqM1jXeoFbT5ri927ZzS4lCQfy4NaVtrWGb3EzNe2bX0nhhpBTgn+ypxHKTnJxXoYAAx/VXtLoPYGhXywkLqq3PyF+EoYSSKrXVoFoOpGSOauBRKSVYz71Ef17C2z5u9UXWC+srL6ya2EFWyT4Eja4sgOc7vaiypzaZKSHQSo45oC8hxrKgQCk4HHpVlyO6Gm5bCQ4Mjfj2rLWVMQyCOTYNAzQbU9804wouH9QMnYPzD2pshbA2koGCrntWd2K6MgoDSs44Cac4c0Ywc/T6U+6Z2suz5ijNLd2jDyUx3ch5Ac5zk+9fchteEhIJPYdqHJlANgg8k1BMuQbUfDIyBnnmnaBE/wBTUVObHOtz5fZYS34ZQFKV3OaQtbtMxrWQFBSicHn3FHlyHZz6sOAto8yvoaR+ot1bj29Te4qe7hI9vekmZauRd3N48RtjVtSmxDXTKY3cLVLYLm1TWDg/5qcLFckhYjhJS4nOFZ781j3Tm8phQ1OvOEsvODd6Yp/jS/DmJfbVvac/Lg+hoTFcqwA+snegcEzVYUwLQlSVHd6+1E2Zm1O6lC23BAaSjbkgcmiIuBSnaSMe1bWnhQZn3HOowm4q8Ld5RS/d76lsLSXQCRzz2qGRcWwjG792aTdQ3JKkuBCk5PGfelvV+ofpayFPMJw8X1X2RxF3Ud4kTbopIdyw2eCTUKPDK46yoghYUAfWhBeM2eGNwIQdyzjsasS5BcuMJlCNzaHATg4JrHUpsln9zuPbGOgo8COsu+RWIKkzkhQPOT3H2FJVuuCZUoqawcqynjtzTBqO2oucRMuPvStsYUg9qAWuEI22Q63sXnkA0t6pUzMO3wIVjMqIV+s17TN1U7HDZSSUgAq9zTXGnJS15z2rL9P3ZDZAGUpxk03s3NlbYxyT9a+h9Cy/WxV55EyufUa7juMLkxKuQewoNPklSVkKGB6ZqBV0SkHI47UFul1bQglCVZUcd/WmeQ2gWMDQNviLuq5gfcDbiRhJz3pC1Hc5TsVUdDRAcOwAe3vTJcQt+UsTMgKOQAcUpgu3bVjNvThUNhQK8c81hDW2Tmm1uFE0lTelQFA5jXpJlu325EMJO7A5PvWk6Qdb8FaEucpX5gPWkZlyGh4tgKSASPsaP6SleDNfjpHGQeat6XlCvOAPggiVdQrLY00xKxxyTUzb4HC0+U/ShUeUSO2cVYMrvkVs3YMupmeQZ9lvBS923yjihzzyVfrOyRwBUsiYkKyeSR2oHPnobbWEdwM4pRk/DvcOoPcdTzcbgy0FLWPMDxzSXdpynVqUjypIPYc1Lcrm3jxC6oKUefpQcyG38LKVbT7+tZe+9rX1H9FXppswTJaTJUVuAhGMdu5qeJax4aSBtHqMVfiQBKe8d3IQk+ROf7avvlCR5PKoDFP+lYQAD2CLczIJbsBlGLZ5E35j5aI48mFHVJfKB+Rsd1GgEd+JDvMS4yoi5NvCimSyCQHG1DBH9VMtm1JdNKX5m/wIiZBZCkrjOOFLb6FDCkKx/ZUmp9PWSK1CumnbyuWzdkqfchqSMwMn/B7u6se5p9kIG7XXRH0ieu2xHKN++/tME6iaeveibHe9H2Kw2CdY7rKTcIi3YgVOjIKs7o7o5A7ApNZRbo11mzRAi2yW7LT51RWWlKfQlPO4pHOPrXTt2curcVMBDrQaQhbYK2QpYQoYKQo9vf8AdWcWp7UeiNZf3X6a1E/YtQRojjUeaiImSl9GD+rWhXBB45pMO1ck+oxA1wfuBx/aafD6hYMfsUbP3+k6C/DSu8+7dZdROTpTj6kWJKQp0YUnDoG0+2PrXPf4lq9nxX6mKTz8jB/1ddBfhvX6PqH4hdX3NqLLYlS7GmRPTICUgyVPfrFICeAknkD0rm38Tl8p+LrUjaDgmFA/1dAO3xEk+3mHId5Wz7gTLOk2nUys3h9JUtStqPpXROnbYhpCVFHAA9KzbpVaBE0/DGPMpG4n3Nacy6623sUFfWlmIhuZrWgPUbi79gMaYSG0qASoYo785tZ8Dy7fvSNDuO1G1OQEnjNX27ipxQ82Qe9NKs/9PwPeLP0peMJeVv2jGDVqOFbck5xzQWM6FnkE/WjMUEAYB5pVfkeq3EZU19o3LoaDiMg96nYiKSPOSc/WvkdshPKsA/SiCEoAASSR9anQp7tmSt4EHyI5bJIAwPQ9q4Z+I+Cq0a8luNtrR4jhXvBxmu7pOMqCzxXL3xQ6XbuTargwwC6Wy5uHfcn0/fzRmcgNXcfMN6LkehkfYiSfDB8Qzc5mP081jNKZbR2W6U4rAdB/4tR9x6V1hAuhSQk8KB5r+Rbs+RDlociqWy8ysKBTwUqHr7iu2Ph4+IZvWVqZ09qWShq8w0htDqiAmQkdv+tQeNacMgMfgP8Agzudirksxq+YefuPtOuGboBnCRk+tQSrgtPOUgE96Tmb35eVBJP1rxM1A202S8sbQPenyWqU5OxESY7E61zF3qZOEiOGVLCsKJSPrXM1ohaHgdVLxqLqXa2rnbmoUgQYqmS6l2Vsw2kgdgFHJJ9jW1ayvJubh2qCAElIA/z0l6mtbGsPHlQrHGiPWyGgL+XUQhSEHBcOf2yTSlMf9TeSvn2E3XSaq1pKXjSn334mU6UtSLNcIV2jvBiUHg6hSOA2vJI2j2GcYrtHQHUYXeG2i4+G3JQlKV44B4/MPvXPN707qjQFmRB1Hpm0unU0RC4ji3d70VtPmDidmUhZB7E5xRbR18JYaUlYDzYCVEcHj1qu+qzplq2KeT5EM6pj1dVpBHIHAI5nViNQx1j9W6OKCah1KlMdbaVjJ4zms0h6kk7BmVUE28PSAUKO/J755FHvmteulHmZjG6OK7AWkd3uT4mtuRXNrrKw4KhZTYbjGvwvzbka4vwyu2PMJ3Jbl7wcqHsRuH76q+C5v8RQJUe2e+K9t7kOb9h54UaIxqjXyRNSKU9PtB1LsM3K2W+S004uMq4shp3YSCtv1QFDsDQaUhMVhEeP5W0DCU+gHtRyUQlhtpa1AABSUg5BHvS/NKlLJz3FEZfygTlWmJZvMOackIjqS2V4WcHA9K2LTWpgGwH1hJQAnB7GsDtMwtv+ZIBT606266ktgrcB9eKT0uabNiJ+qYS2nxNt/TTCxuLwwfY0sax1/a7DbnZLskL2DhtH51n2/wDGkCTqF9KFJQ+R2HB96yzXM+dd7g1ZLUJcm4yVZQxGQXHVJHcBI5Ioq/OuuX0qkJJ+kW9N6GjXd1x0B5iZqaY/r3V8u83XDL7/AJEOKJISgflSM9qYrZaX406PEQsBhDaSFAZK/rQm92HUNiuL1ouVvkMyoRAeDjRBTkZBI9MimnT94REtLlpPiPvSfDUF+C2SwE/shR8yc+yc59aDTG7K2rs4P8n/APc2WeClAanldeB7D6zStJslh5hxbSklRwBjg4NbvZ3x4KRgAlIOB6ViOk7g427FdDYKWnQ6kr7pOe1a/ClJX+sR3PmOO3PPAo3p9fYD28T5v1TbPGxmR5O9ezJCOSM0EZnAp5Sa8vXAgEZ7elMnt7eIi9Ikwi9cFhC+BS5dryGW3FuugJxzzUFwuoQ2pRVtwO+ayjWetJT05qw2dKXJLyh4iz5ktp9c/WknUOqCpe0eYdiYJsPd7DzGWbczd8hlJLI9fUmrkOG3DR4xGMjn715sEJDcFt54cFPZQ5z71fdR43phA7CrcJTWvq2Hkyy9g3wJ4EoyVl8cJwO2RVWM3cIUj5iE6NyT+VadwWPY59KKLaQhPOPtUWP1fAwfoaZ0ZoVhqA2Vd45n7UNqtzwQ9bXWUrktBb7KM4adPcD6Vl+ptNIfSsLB3dq0wObFKBAUlYwoHvQ24wm5CMKHKRkcVdkImRyBzIVO1J5M50mRjEkqZeTjBwDWnfC2w3/LhZVg8iNN/wBSaE6x08h8qdaZAcTk5FX/AIWlOtdd7PHWkgiNNH/4TSaysrxHVeV6iTU+oc5LV+1JbExwS/dXXPE/mkHkUjA5OO2KPdRpuzXuokKXgC4vcfvpVE5CnCM5T64pvmZlb1Kg9oLj1EPsy25IAQEhYSanjIWQD6mqiCkozgnNX4zqleT0rLX3EPxHtKhRJFhKU7cZUT2qPb4LmSnaDVgMpV5s859a+OjCw2RkH1NEYrtZ7yu7iArm0jKhnCVg4P1qLRb6HxJtjj25CVHGc5z7VdntJIGF5A9cdqTbdeJFj1qYMlomLJRuQpP87613LpKWhh+87TYGXtPvHWOpVruKmSsJSDlKcc4ptgXHe2E+Jg4pZuyfngHGUbXcA5HOahtl2DOWnMhaOCD3q/DsUWfvBsgn/dH5EpKUAl7vVKbOQhWQsEmgaLuAMqzg9s1WdujbzmzGD689qcWHVez4gSnniGHbgqDBfdJ4PJJ7/urLb7IVdkSJLm9ecpGOOaY9Q3NySBDaVhpCcZ9zS9HjyUteChwKSSSoeuay9xFzcHiNVJReYG0vd27WhcB47g6QVJKc4PpWjWiYZLJZZcwttPbsf3VlttZcTPddB3FKsAY9aZP0xLYW2X9iXR2I4B+9UktQ/ePb+JPa2Dtmr2q/FDAS6RuR5e/eiH6dS8DtWEkfWs4h3tE9KErUll3O0gdlD3oyh1ppsgrUSBzin9HW6vS2PMXvgWBvEPzr6pSPDbWFL96XZU5TSH3pWAlCSUnPrVFyY3IcUzGKlE8K900r3ibJmPt2OKVJG/8AXLz6Z5pFkWWWubn9/aMKlWodohXTbUi4reabUUocJW47+/tmmmJbYj91jNNq5aHIB5+5pXuWo4en4bdvgYU8E4VgZxx60GkudQLPZ7Z1CnwIrFkvckx4D7c9tch5Sc7iGQrcAnHORxkUzwOmtcncD+f4Ert7m58TT5c1yFN+XU7uaV3yOKps7kTVKyHGz+ye1LMHVDl4a8G5JT4w7LT+1UkW6KQokhR2nB96WZldlTdjDiEINR7fQhcNLraQ04jhSU19hX5yOgNlxJ28fUVURNMyI2GUkAgZNC5TIRuWVkK9APWrun5RwHOvlMEyKP1Cxmkaia8FQU6Oec57UHReGHVLkvvjw0HCOe5pfnPMxmC7Mk+GgjaAcd6Um7quS6WYJKgD3Vymi8/rrvwi8Qejp4T4n8x7vV8jRIbstxAK05CAecmhegWmS49OW7ncScn3J7Ck68XFZQ3HDapMjd58nt9KbbFGctMRAwkKcIcKf5pqmnIAT1G8/SWPssB4mhs29h9Bed8u45T71Zt7DjM8u7gpPAynvQO2ynJaAtxwkKGcZ4Bq2xcHEycJwAPTNQxSLMtHC6kcruFbAmaBDmhAKdwORUr03y5BxS7EuPAPFSyrmlJyrG0Dmta5KiIu3Z2JckzktnxCr0xSlfbyhC1cqGUkHFfrpewEqwodiRSbNeXJe+dWtYA4SM8GkvULvh7RGGInxeJ7bc+aeKVFZHcURaiPyXUDGGxwMdsetR22OVNBXZbp8w9hRuMx4DOEKJx60uwsTZ9RvEYX3DXYs9rb8NIbZIAqFxpIG5XJr2tOV7gVfavDgWsbUqx706OUo4EXmnfmV1IRnftqEqQh1LjjJW1u86E8HHuKkWjwlY3EgV5dGG+DzRdGSfmgr1kcGQagtEZp0GLJTIiyEhxlwDBGf2VfUVn97tSEk5SUkcIUT+U9v6qe38qZLWTgcj2BoTdIiZjGckKxzkcVHKrDrsjcprtetuDNE/DxsCrT1u1I+8gFx2y7CpPZQ8UHg1zj+I1YUzfi51HNWjcPk4I+nDddY/Akh1vqveG1r3JTaeP8esD+PSCmT8TuoTsKiY0TgfRFIGr+EqviNVySCHJ5mZaM2xbSylXGEpxTciYHOy+KTLJKSmCGFNFLieCTROHN5KTng0PiE0U6PmSsPqPuMzMhJ8p28eoq9FcSV7Qc80AjPFzAHei8VxIA55FC5AdjsCFUlRwYyQXEpSAfemKCCQFA4zSdFkBKxyMYpltklflR6kZqrFrLvzLLSFHEY4iQsK82VDtU29TCsKGQR2NVGCpJynv9D3qypa148RPBFaKukMBqBNZqQS1JUDzkjkVlXVO2/pCIVbQQE4I+tahOUW1HaAUkcKpP1Kx8xHUlW0nuPrXcmosnZO0P2t3CcAdSdIO2fUriIw/Vv+ccdj7VS0wxdLLLZurBKG23Ad27GRnn99bX100+IkZuSpO0lzBV9KHdNHrVaZMOXdNO27UMNht3FumZDLjiklKVKI54Jzj3AobGx6bD6N54myqxx6Yy6hs/+4/vNQ0f1FuD1tRumKcwkYBczTMvVDkhBS88pQPopVL0XpEzq4Q7T0xipseuGoy59wtctzZbpkMAlDkRauVPKUQnwxzgE+lJlpueoXwqPcovyrzSy28hQOUrScEfuIqrL6bdg6C/Ep9/p9iPP/Eox1qzmbtHaw8g+f7faOd5vgKVZUBt7YPeqmnL/NZeeLC9qXm1MuZ7KbPcH3oS9HW+Bvzg+tXbNFW3+r2khBxnHpVuKtlPJmgrqqrpKaG496La6NTNDal0z1Rud+g3bx3brZp8Yb47OxCdre0HcVKIIIPABrzeNGCx6R0vq/5ONCnaodcfj2qNJ8d5i3pSAJEhI4b3KBwKX1wWnyAGyAAdwNH7JdJNqamNxGm3f0hD+SfU6MkNZ4CT6AewpqznIrFdnIH+IsfH9NzZU+tnZEqwpDqlHY7kAZOAc0fgOodSguJ5PGTQ2BAKEjb2xj60WaaQjhXp2qjHxPROzLtoTsS7Jkh5xIH5UDan7V8QnasKUnKcjIzjIqJLzSQVKGcewr0JaMKSo8GjiwElv2EsTVNyBhCMBBIb5yQPbNA5TLoJwM4oq/IZ8AvKXtXnAAHpVFE+M8VITgqHGPWq3Kt804F44lNLccMr8VTqZChloJxtwO+6ikCz6sU1bFuWpmMzeWX37a5LmMtCS2zjeRuV5e/AOM1TciJd5bzk9xX2LJlxVRw6EyBDWVsIfG9KCRjgHsO3H0odsSuxwX3r7SD9zL2rP11g3232xq+XK4WSK27K+UTZw+ty5ucjK0BALe3GcEmth6Xaa6ZXGJHkmwyLFcrHOe1HAmyLklcqe0ygfq3FZ3JRuz+rPBGKz9GuHYNqiRGLBbjJjxjFVJW0CpxJJVuz3CwVHmllyS6+FKkLUpSuSvdhSs98n6+1MKRVjD/S3v8AiLLcGzNT07jrk+IY6i3DT1+1G/qrTU/xo19aRNltJbUgMylDzoAXgnnn2pWtao0FwzorYVObfQtt1R8iUp9NvrmrLi9wJ/aPY4ql5ErAUAOe496BySS5dY4oQVU+iTvQ1Hq0XhT8h2S+UJW86XtqBtSFE5OB6DmtHsOqIrjaUB4JXjBSeCT9Kw6LODSwEqxg96JJvTiQojI9ldv7aU1321HjzM3m4YsJ4m9t3tIwnxBz3JNUbpqSNCYXJlyG2mUjJcWcAD1rD5mvZcCMQzJ2qA5Uo5xWQ6w1pfdTrVETOfebycqKvT6Cqruo2MO1V5g+H0B722x0JpOvPiEEu7Gy6dhrdj5KFS92PsUjPNMfSixFbvzjqnnXJRU8+66PNn2+grKenujGUyGpUptLiinOSM4NdK6DtzUZkk8FXYH2pdiYotv72O57qz04qehR4HmOUVhsNhC0ApAwM1G8hJHl4A9KnAw2oDG49qj8JeCSR2p9kfFoTOp52ZTU0fzqGR7GoFcYA9atvAhJBPND38owd2ftQtblG17SVid42JA8tLZKifWowh99K3Wk7m0DCj7VDIcSr3HPrUTTqmtwQsbVcKGae4thYHcBtQgQBfoqC4oFvOeasfD7ZYLXXC1XAvKbdSxMCG0jg5ZOSat3BDL48ykk/ejfRS2NxurFrkIKMeBKx9/DNWeh2dzGV+rsqBEHqbOWOpmqWyo4TdXwP66Dw3GyoHacmpuqLv8A609VjcOLvIH+VVCE75go9h61j7cliSBNZVWoG4fiqS0dyskk/wBVGYoCkehPfig8MZACk8KPBozGT4QJAP8AV6VKupreTJmwCelLcTjaO/pXxedu4/21OtCNoXvwMc1Cp9pILavMPemWNT6Zgtr9/iDJqlBISgDBIJ4pB6owJLUOLqO3bzItbvjrSgZU62BykU9XAkNb0K7ZJH0ofOAkRNqeStPPGeKvytd6k+JVXvXw+YI0rriFqC3M3C1yfGQscjsps+qSPejlxMd9kSmV/rUjkDuazOHZ4+jLu4qK2tMeS4V4R23HuacNzLzIW28oFQGKX5FTYrdwhKuuUvPmemrzKSvwltq49zVhmU6FKcdyM84x3qklEwuJSlWCntkVfXGfeb3yn0DA5oVup2spQ+J1cNVYNuDFvvypoKyUtA+VNG7fGwFCMhbjqk5Ksdqox45Qsoi9j+ZQGaddM2ZxMUSFjaSrge/1oOl27wBzuEWaImZrtz8G+qeZcUNwwUfWjU1qO+n++GCFE5CvtRjXLRhXKDJabSrwnP1pxgEGri7ZFlbXtgUD5uPrTG13SzSDz5g4Re3R9onuxX4a/wBUSC4MpBGKPWiBLdiobmzAAOVpByce2atSLO66E+C2rKT6nsK/RbVJbSUOySB2H1FdrVFO+2c9R343KU2e2wo2u3IQgqG1To7/ALzSxebhF06xubPiy3OG/dSvemS+JtVjiOTpUtDWOPqs+wFZtIkrv9zMh1pQaRw2T6D/AMaNwsKzKt77RxDcegdnc08W9+VMdUp9K0OlRUSo9zTxbZ8FdqRZbzDXLjRvEdhIQvb8u+vG5Y+hxyKAxYm9GA3hQ9aKx4/lLjqdoHp71uMbHFHAkrVFo1K5SqL+vSoDYc8GpIV9U5NJUCEr4J9Kp3d5KWlISe449qWXZsiD4kwnyMpyRnufQZ+9K+q4a5K8DkTiodamxNyZNrj/ADa1rdYUOCj0H1oVcNWyn0Yhx3FE9vL3pet/UC1StO2FvTUqdJvp+YOpYbzOGY7YP6rwVftZ9TRtN+S7HQ/HipCVJ7ZGAayNuLYh7BvUqCuvzCAlw7zen1KfPh/zgpWcCrrVubgsFoPgAc5QO5qeLcIiEKkyrk2yhR27RyTV8XbTxYcYjr3vBO5K1Y7e9DV9LusO9GcdtckQFp1phV4Wqcjckk+HnnJrRInhutHdjaBycelJdrejN4kxHkOr3ebjkCmaG/HfTlpahn81QtW7HsIPyyg1BgN+ZLbbm3EuD1uQtRGAUKA45q7MuC2pO9YwAO/vQG4urhyUzozYUE4T9xRFi4sS04dVncMkK9PpXsfJ04KHx9Zy2rvXtMKx9RDsCQn6mvcnUSS2oodBJ9BzS0/HjuLJ8dKRyBtNfmY8JpO5SgSkeY55NND1wWL2r5i4YTKZdkTnJKvEdBDSR6nFQx0i4PIc3fq0HgA8VRCEXhzalagy0eyT3+9GoMViIhKQSnartQyl8hx3HkmFqvpA6hy3xw45uKSEgdhRVSUFG30NUogGxODwex96t4J/wY4xzTuxPTp7FgSnucEz5sBQUI7DvmoH0BpOU1bWsNY2J3Aih8zz8qTwaT2dwPEK2CNTw8+ggJKchI9qovKOwYqw44hOAMfaqUl0IASe5o/FtGvMFvTuHEquLwoYTuAVkjPtXt55uSVrRHDSSOBVR5/wSSpRXUZmoKM7+/pTdLlZdMYssrJ8Td/glilnqldnFD81sI/y6wX47nXXPiOvaEx0ISzFjjekeZeUep+lb38Ez4d6o3VIOcWz/wD1WJfG2x4vxGagynP97xf9ClOQ4pchPBlyqXo+LyJz01dHW44YQ0jhW7djmiEC5sPOYcBQQME1+MNgpJXhOPcVWjwkuvhSUAp3cYPpSq5vUI7IZU3YPijLHfS0lLjRJJ7/AFq+1PbG5ZUQT6ntQ28QBFbZ8BwEqZ3FCf2TWL9V7vq2yIYm2a7yoyUqwtLa+D9xRN1VtWgPcQ3EKZDBROjIU5C9oDicn1zxTdCngIR5wQP5tcc2XqP1Wj3W2Wi4TYDK7gE+E7KSAgJP7S1egple+JG+2Oau1TbVFuCYzpaVIjOkJcI7lI9q5irYAX7N/tDrsCxiAvn6TrVm4IWNzDgIHJyasquRQlO5eRjsDXOVg+I/TFyIRIL0FxZGEup4/rFaJbteQrgwHY85l0EDGxYJq7/5FFIDcH7iDP0zIr5ZZoEqalSMheVAe9LtxfL5WoLyhA59MUJe1ChTa1F0J49DSze9UNstLBlHCgeE96kctPmPP8zlOHax7dRU6utQ73bDEdSvJcGCj0pL05aGLY0hhCCBn8yj70Ru0qTeJfiJUUhPZKjj174onabYtzYp3GAeATUsZjYxcjR9pt8cfpMQVEzZOmnVexW26QXdY2ZQdstkn2+z3KJ/hGnXmVJQXB75OAr0zmsqtNrkRIDaFo3uKytxSzuJUo5JJ9Tn1q8phLBAK0hXoM1DJ1DDtqdq3kqOM7RzR73/AAhWOx/ECx8dQ5fHXzLSLYte0kpBPvV1ptiIMuKG4HvSXceoACCppaE+mCeRQVfUW4PEIaQhSMYK9uaDOQrHQEb1YGS3zTWPmY5VwrzH6d6lYnNMKJUUgD39Kx1vWmog6AmWkNn0KcH91VJF5u89xSnZzqkqOCN1S/UMB8IhA6YzHTmbe7qa3xyVePkY5KRx/XVBWvbMykqXJWpQPACc/urIESpaWvl3JTpaPZoq4JrwuT4CMqdSgduTXLMiwydfTahrZ2ftNbZ1szcJBSlRabA8uT3NGoN2jzAVIeG9PBye9YM1qqBAcy5JyR7USga/tqV73ZW0A549ap9ezfMstwk1tJuL06MoBLis49Ae5pP1Dc3mJZchq2kHnBxSsnqbYW1HMkEKHYmqT2pot0WoR3k7Vcpwea813qDe5zGxuxtsI3ROoUmK5sfaKwfUK5zTHH1ta3An5t0NKUMjeO376yNToJHiEjaec14cKXlqDriyPTn0qaWWpwDCLcPHu58Gbmm7sSEEsrQ4gjIUnmqz0xzGGwnB7Amsdi3G9QRi3zFtoHoTxVlnXmpoR2yUNPjOAUjmrjfYF+IfiAnputmphNcQp1SQdv8AVzVeQor3bvQccUq2LqTGmoDMuOWFjg5NNMWdDuCAW1gBXbNW12rYNbi3JqtoHxCQPh5EVa2mVuKabU7hHc4GaaLn0/stl03aL31C6pS4P6fiJnW6LYoJlqbykFTMg4whYJxQtiE084hh2SWWSrC3AM4HqMeuRxVi/af6XsaZgXjQOoL0i/ic4i8Wa7FZPhbz4brK8bBtwCcGjsbHqr27aOzz9dfxM9l3F3WuskH66439zAGp9FTIBjPP6a1LZmZMNDxZvTfhqdPbxG/dJ/sPFBG9EtxDGmoca2yVlIQD5kkY5I9uaOagul7v8xV11DfZ91mFtLXjS3ivCEAJSgegAAHavWkQh25JU4kAI/fSnOWp3KougYc1ttOOdN/77R50tYGYjDZdSEuBQyMYyK0q1ENpSGsYHtSbCyoBaAc5zk0zW+UltvIOFe1B11emdamRyHNwjcyskJGRj3qfcMdxQmPNSlvznHHarPzKNm8YIo9ayw5izkT9K3DJScAD+ugUqSMbVZT70QmSeCQrgc0uT5IcJUFUtyU7YVTsyOVNSyFAcg/v5oSbqoKUOcHvmopkkqCk7sY/toQ66kgkPEmqqcmwNqWOikcwm7ObJSoOHPrzTt0JmeL1UtjSjkeBK/1RrKXHwDgqP3p9+HqSHOsFpaScj5eX/qjTqq5mU7gL1BXBESupm3+VbVy1AAC8SM5/51UYjrLafMRsBzmo+rMgfys6wTuIAvMjOP8AnUu/OjYAJKgnPKfQ0ksxwTuO67QRwJoECcxvw45hHoQKKfMLd2rQopSBjOe9IVqvsVDC0LS44rOEJCsBP++mSHcvEYCh5gOwNE4wIGm8TznZ4jC04sJCclQIr4Q0kZWrChzihRuSygHJQQPyg1Cu6b8Je4z6nimaKgHMFckTzcZSVgsJBSTzuzUbaFhoHOcUMnS20rJbBKh2571fYkq8FPio28d6DyyFcAS2oFl2JXudsjXCI4hTY8VQ4PsfSgtjVJjTTZ5qtp7trPY03xNkoAAZT2716vNtjFhCWylLzfKF+o+lL8rIDDR9pfVWynep4ZgBCFFzco5xkD6V9as6lkqeWfDV2zxVCHqNllsxnVKU+hWFDuP66s/p9BKGfBUATySaUpu35hxDte8YbdboyP1KWwEYyTRb5oRkhDKwoNjgZpKm6ohQEKUqclsJHYrHApNuPXLT0dbrMF56TISMbUp8pP3plhYVnsP7zhRrOFj5rW7Rv0cpc1ISrd5Tn1q1p+8wJEFtReQslAzhWMH2rHn9ZytWpS5IUQ2jkN9sfuqut18HMd9bfp5SRWjr6WzptjzOigp8LcGbZdLvbo7K3VT2WUJT51qcACayzUHVaCZjtv0/IcnKbAT46P8ABhR9M+uKTbvaZF1WlL7zuz1AWefvRKxabZiIU0lsEDkeXk1anSU7hsQimimtSznZ+k+Jjz7pLTOust2Q4ecKPlT9hR6Db9hC0JAHrViLB8FIT4fA96JNuIQ2fKE9qdVUV08ASfczDQnuM0GeQck1M8pSUY25FRCQwUqwvzD0xXlyWpXGSBjsO1GFwBIdpguY0XV4IOKHPMpKlsOoCmXUbSnH9tHFSWlOK2qbyPY5qqHUOq3bAo5xmhSVY+ZIKy8wIi1/KvH5OWGkKRsO04yk+lWvA8KOGm3VBtIxgHiiEhpggK8oOOwqoQgjC+R6c1BqkPkTpYuOZVjtLwUZGzOcEd6bLbJtDem3LS/ACXEvqlty0Jy4VEJHhKJ/Y49PelxDoWOSMDsK/PSVNtKwsg+wNdrVagSk41fqaBni4XV2BKD7BCVqICkgcEUTsOsGzI8J9SUknsaWHVpdKlLPJHr2FBpQQ2FS0lSnhkJQk/20jz+mrkgsPMkFV+DN0TcoS9hQgrQPXBxmqs8MuBSo6jhzuQe1Y5YOpkq17Yk59XmONp5ApxR1Ngstb3g2G/6NZG3pTK/cwPEobHdTwIzxno0VCy/JJ9OfSqUi6LuEhMW3IU4lR8yk9gPvQGJcpGt5BbgPIRE/bUk8/anez2qHZWUsoawkJ7n8xNWVY60VlnHMW22t3dphOzw/lGkpKRuI5NX3XU+MEJII9apQ5W9SklfftmvDe8PKVuyM+tEYRW19iVXMVXUbLSchIKuKJcoJaSeD6+9L1uecHhqbSfqaOpeSEDcefb1rSBO5eYtZwJIlSd+FjI9qpzloAIBx7AmplrTgLBoZNW24FFSuR24oHIoCqZalu/EovSsK49KHy5o7qPJr7JkJQsgDuKDz5PI2ikrMynSwnhhP0yblJwrk0Ndn4TgqINROSFhRSpQxVGQQT5sEfSjcYu3mD2IoG50/8BkgvdUbuk+lqz/l1lnxrK//AJE39IznwY3+hWj/AABEfys3tKc4/RHf/wC5WefGY4wn4kNQeOlRAYjfl7/kqWVpeDKl2a5g/wAl46wXFFKRwaKRrZEaeDVvQvwyBjfySo96hQN7m1KFcmisQFCAUjkGq8fH1aG1sSJba6Bly/abn2OS3BuBYLrjKXf1S92AewJ9D9KyjqhZDMtbu1ABT7jitQd3qcLrrji1K5KlqJ7Una28NyApJG7cPfimuZbWy/AIR05HS1dmYTH0pdD4Mi7pdLTiMMrd7FI9BTs1pyx3i2oRKmR4vyzWW0JbyXl+yj6Cq78t+SlpuY6XGow2MoI4QPavwkM704RtH0Fexn9Je5PH0m0PqW637T41pOxoZW060fEIwCjtXu06buVkd8e0zXfCP7G7AxRBl1p1vcrgn3q01cAwoYIUB7V24V2jTAGXo9oBUciWUz7wEjxX3BxjmjGm4ul50lw64kXoRQ2dibaQFlfoDn0NC271FKcugc+hFekXqA0CobAn8376ErqoqYOBoj+8ga7WUjt0TLL9viKfK4Ud5EdKiGvGVucSj0Cj6mrf6RiW5kKcKMpPr60sy9TNlZ8Jwmla8XuS8sobXu+hzirnu/3AQ7HwntIFngRjvusFvbm2EhHJIIOSaTJd3lSypvKm89yTyao/MIBUp549+wqlIuaUoISCo54NUV1vYY7orqoXUvlpCUF1T4I9s81GxNjR1j9aAO4GaEqVMknehteFd8egq7DsgkA7lFWeOTgijEw2A8SFvUa6+N7hVq+Rkr8zgV9MZr6rUjGdrCVn2wj1qNi1RYawlwpKiPWisa2nah2MwAT6beMVeMQNFj9X03iDXb/PUkeBCWVH9pQ4zQiUi9zT4ji0kE+iu1aInTbMmElbRBVnJT6ZofJ04mCW1Lb2qWrCsdgavTFQHxB7OqO3yEf2iKmzy0Lw6k4J70RTYkhvY6wsHHcU03GO1KcYbbQAtCgDgd6juyG4yWipsHcdqucYr11VajgCWYeZbc+idCI67esyVMxmVubT7VMzHntOgNodbXny1pFo02EkyikbMfl9KFX2IyHwpkfrgrypR9PeqDRURrth4zbDZqscQAxf7lDGycypZI7qFGId6bfUAoJzjPeplxYVwZbS4lQX+1kdjVS5ae8QBm3t5cxnf6AVTZirsdstXO2O2wahpq5IA2EpRn1B71+ekIdUBuGfvSXIsd3jjeNwSDjhRq2zAujKUF1zd7gnmvGh1E9+qq3rvjGmOtzgOpST7Uas96nwlpackhW38h+lJP6Vkx3fBbb3LHZI7V+/T8hDvhuNhKselDPU/wA0uGruN7m52PVBlqEZSNq0/mBOQaZcpkNeJ4QChxnHNYVY7+8wtBLpyea0u0ajCm0tuScKxz7Grqsnt+BoizunlT3Vy/dm3MnCcE+vvVexzvk5PdOB3q6maw8kl1IWCeDVVyzx33C4wsN/tGqsnHa8d1J5idriqmuyabbbw27HQ4yQQtPmH82i8SaRhaCFCsaYmzrc7lPiYHA5IBFGGNf/ACg2qSrcO5SeKVPlup1Yp2IofA2doeJsTFzU5kDv25q81cFkbTkD1NYi51VjxCFLJyO/HNVXuvVliEhZlrXjhKWjgmjKM8vodp/EFs6Te/KqZu0y4p8EhKhnH9dKkq4rS6SrBGay4/EBblwXrpO0/dWbUw98u7OQwVsocPZKiOxoerr3oh97CZb7ac4BXHVg1bk7ADWqRv7SmrCuGwo3qabJkeIVrQeCaGPPKKSElIx3pZtfUPT18BRbbihznnIxg1ZlTDje2rhQx3oata25Uym5Xp+ccyWVcSklOR3p/wDhnneN1ps7foY0z/UmslddStYBWMn0rT/hcZUnrbaUE8/KzOT6/qjTCqtrFPbArLQCCfrMz623t6H1g1uEgpKb3KGffzUjM68gAhpbw3H8wUKf+ucRlfVvWyldzepJ7f0q591LFRHueGwUFRz34xQP6Mu5BOjGFeaEHKzZ7brCCWgre2PQcd6NsamjqWVhwJ9gPSuc5WpUWVlKnpQVxlKQeTVq09U2FqKZAUgYGM+tcuxMulfg0YdjtXkDYE6TTqiItKQ65k+9fXr+y/nw3SQB61jsHXNrW00srCt3ACVUxwr1FlpBakgH2NUnMvxxqxZa+GPKx5iTVPPBSzu9qMyJpDKElQ+v+6lCHLaCAQ4NwGMgUatwQ4A447258xpbb1FrG2PE6mN6Y/eM1tkKbZCgkkZylNUbte9i1BasKPpntQ+ffo0RrZGXud5AH1rMtYapfCzDivBbrnLikn8o9vvXKMZs2wd3iG0Y5tPasMy9VyWLq6uGUKR23Edz60PvOrdU4SEKcbStOUEj8yfcfSlSLPUycuKJz6nmiPzapiklZUooTtTk9h7Vr8fAqHwmMf0qpwRzAFwcuV4mqcnzZC93lwDgYojDtK3EpLbYSEcdquptzSnS4MZo/HciNx0oajBKlYyon1plVSK/adtbtX4RP1naRFbJ2AKxjjjNE/F2rHCSPXPehqnUsElGAf6SsCh8zWdggLDUu4pQ7nG1A3Y++Km1q1+8oTHsubYG42sLaUdwxj1zU6rjHjZy6lr6rUBmssu3VJpv9RYm95PBecHlH7qS7rd5dzdVIuNwW6s84KvKn7CoNk8fDDqOju43Ye3+Z0F/dTbW21LdujCdnf8AWAgVSR1E087I8GPdGXsDk5wP3VzXKuyQkiO2rPYqycGqjciW4sEuFP0Hr/VVByLzwvMLXp+LVx3E/tOq496TcJRciutrRt/K2e33q9IujiWiyh0Nkjze4rlmHd77byr5ae+wSOSlRGRV4a61S24ksTlLX2ysbs1Wb7kHxLJP01T8QbibJqGe1b0eJHlLLqu6t1LydU3NpADM9WfSs1nai1HPWHZsjChxtCAkGp4WpPCTsloWFnjI9Kht/L8QmqhEXWtzS2teX+OpJX4b7f7SVjvROH1Bt76QJqTDdB9RlB/fWcR7zBeThMhSVH3qcuwlgFbgVnjFTViD8JkGxaW+ZPxNUa1RbpRy3Nj/AHyBirC5xkALby4kn8ye1ZDIiwFDO45I9FVV+cu1tTi3XWQyO4TuyMe1Wrc4Eofp9ZG0Ov3mxqcRjBST9xXlyOl9JKUkZHtWYQOpmprarM5uPOa4BStG1QHuFDvWhaX1ba9StfqFht05CmVHBT9qvry1c9hGjFeTgXUL6h5H2gZ3Te6YFqZCiTnOasvWNtLKSptROD9qZnIrTay4VqyD2xUUjYUq8iiAPer2rUjkQNr2bgmU9CTm7Dc1tbi0h4YxnjvWztSmZ0ELSoKWOBiueb1KMRwPNg5HYU86G1a6thKX3AQR2T3BrMdRU12dw8QHLxyw71j+xPcZdWSkhSe4xV6POD5KskFXHFVEy48hsLUgpUsYBNDHH0wpJ8zhB5GBxQWGtaWHtiu3uZdNHSFdEQgGt6lY96vpuinDv3cY4NITd5ZSrzAj65qX+6dpjCUc555PFNTmqD2kwM1Mflj61NUonxXMewqhPuDagpOdpT3+tKZ1lHDYW882CO/OM0Jn9QbESEy7kw1uOB+sHNQtyqrBonU8lNqHxDs25b1ceUjiqDsrevClUuuautK1b2pKHEnsQrivn6ejPK3NqH9dAqaC2i0JZXVe7ULyFpOTuoRKnpBKR3AIrwueXATvHPbmqEt9tado7/T1o2ta/wDbA7HIBJnVP4dz7jvVm+Bas4tAx/2lZ18bT5R8S9/bTkkx4vA/5lP/AOHOFJ6tX3dwP0OP9ZWc/G054fxO6iPvFiAf4lB5aHuAaeRw1PcJltumJCirG7PofajkydBfU18ix4SEIAV/TPqaB6WVbEXRh69pcVBbcC3koPKwP2R96v368Rrhd5Nxgwm4UZ1Z8GOP+LQO37zR+KqpWzA8wR2ZrBoT3JWoo/N9qR9XSkIZDBXkgE4o/Ju6miVBY7Y5FZ1qO7tqkqD3mznGDS3ItDHtE0GBUS4PmL0yQdpUj3IqqiUpGBtJIr7IdQ4orQQE/wA3NeEtqcIAGSrjimVadi8zXU6XzCDMtwo74HsKkXIdDWUKINVkp+VBS6n8uDUjsgyULbQxjb+2PSun6GEo+n48SkuVNcOHXCUjtzzUC7oplW0JKgPUqqXYFq8Na+T61RmwGG0khSiQe9VeirE8xrW4J0Z6XeJLiPJsTz618bddeYU6tQOeDQV+OUqC2HCpOecnsa9suvKZ8MLI3KwasqxjvZ5EsexKgNngSw74LivASlSiBnivjVuU0tC0NqXuPYmv0SC+S4QshWODRa0JchOpVKAdUTyCO1HIoSLb7/WX/ROoTtsOO02EhpJV7GpV211iUlxEYKSvkBPvRTRcez3bWttjXu3vT7Up8Klw2XvBVIbTypG8/l+9bb1e6QdMulGmrTEtMqTI1rqScq4tQ1LKm7PaiMpaUeylDIGScnNNqKa7aC1hK/Tg/wCT4mNyuonHyvQA2T95jn9xL9xtKdTJYLMBMpMNbqtu5LhPonv2/wA1ajqjpn0y6fWZq2ytVXbV98udv+ftsu1rbaiwVHASxJQCckHd9fpUejXdPMTW7fqtDz9jntmPO8H/AAkcK7PNDtvSQP3Zr5ftJWvTWo7hY9NX5d/sjCkrg3RxoNreSpOSkj3TnGfeuU5AUAoR3Dexrz99+33ECyltyLAj7A9iOP7H/wBzFaFDZYtrinwtbyUBKUjPLp4AH1J7VZ1VbrCzdnI2mNNX+3xGoLDcuNfF5kIuG3Ly0c8N9sJ47mmbTsiDDu0G4SYCJjcKW3I+WWcB0oVkZP3AorrW/XLV98m6jvUWOiRJeW8Est7QMngKPdRA4yagLgKiuzs/TWoTUbEyVYjgfc/8TEbNFbevoQ4rlBOU9qrartocvEeO3+VagSkHOOaYHbbJYlSriyzukFzdtSPT2FS6a00J892fdWFB0pJbB4wKALsR2zVUFKib9y1Htjj6ER0qJS2AHMVWd0+23NJTGG4ngqHcU42W0phsrS4FZWSVE/2VPNhoQtDqfzITnn1q5awR3e4ik5lnqkD5YvM2RluJww14rh9QMAf/APZqSz6Pl6gvlvsVvRFaemyURUOSFhtoKPYqV6D/AHUzx9bRrVpxGm7XYfGnuTFzrnNdhreJbKQGwg4whKcEn0Oa8xH2bS0L0p1KW2HW1ofxuSHDyj95o04boysUJ9+RFjZthrYBwD+8UL/ph22XuXapTcdxy2SVxHC1ygrScFSD6jjg0tXOxITM271KW4OftWwam011Dj22d1E1Tpr9DWdTRkmXdlBgzVq/KhhKQcqPcZx3oD/J3qlzWum9B3uzobvGrUxpNvRCe8QuxHklQUD6KAHP1NWfobWfQAIOz7f+49/p7zlXVawmmfZH0mUTbQxbmvBQjc66PKpQ571RXpwqdS68jcs/tZ4o7qhsW7WNysIkB5FpmuxMknPkVjnPr7/WrstUZMUb0c7eEhXelVgXuO+JpqMi2qtWU73FOfbyyEpjpO5I5IPer1mukmOfCkOFJHua8yI8h0EtFQVjge1fWmkOJCZTCkkcE/Wld1Oz3COkyO5AjHccYV4BYCFv4z2o1br40Wyh0nJ4CqzFL0mA4pTe51kHJB9BRq2X6BLOxpwIcSM+GvjNDK71HZgWThraNgTRDMZloCF9lcAjvRudI07qGOxbJmmrXanktpZN0hBSXTg/nUnsSRwfpWWO3qYwoYbLYT6jkGpo+pZJWN5IPuDRdWe1Y8b3EmR0ssN7/wAx01Pp3Sj8huTp7xWUBCAtlxW7Dg/MQfY+1JV9sDz6XHWkJSRzhPGBV8XtSh4mSP316avLb5U26nOeM102rae4jRlSLfRrtPA+vMA6L6h3nptcJkZu3w7nabmgM3G1T2t0eSn9kkeix6K+lCrzbIms5F11PGbjW5r5zw24TQGUgjISkewHGaPT32oqZSm7fFe+aZLK/GRuKQT+ZJ9DQ7TVoSjLwCuVjBPcmqeoZOqu0Hexob9vH+ZxUWvuuUdp/mGdC6VVEQtYaySR5scj71o7VlRtSkJI3etS6cgMJipUlBChjdn1o6y2SSpkHckdsVd0/CQJ3EcmY7qOY1lmooSITUeRt8POw961D4Z20/y12ZZ5Py0zH/YmkC4MFqV4p3YV3J7Vofw1sqHWqzuHt8tM7f8AQqrr5AANfiDKpLAmZf14GOq2sVHjN6kcj/nVzzq99lu6DknH1rvvqV8IevdZ6zv+oYGqNPsRrrcHZTbbwe3pSo5AVhOM/assvn4dXVC6PKcRrjSiQfdMnP8AoVV3BrQ0LQMqtucOTlrmXNanGxtSPKcdqJR7aylCXggElPOPWutV/hodXVK8mvtGgeh2Ss/6FXI34bnVplISdfaRP/Vk/wAFOar69dsbY7BVE4/RbXy6HI/kTnjk0RY/TsJQkNvrWkdwFdq68b/Dm6pJUkua50mQB2CZP8FWXPw8epynTt1rpNKCnBATJ/gr1wx7d9wh6ZCg6M5lsmvbk1ISzLYUEFPK89jTiNex22Dh1SyR2Gc1saPw6eqCXAv+7jSmAMflk/wVbR+Ht1NGCda6VOP6Mn+ClNnTcVzsQwWY78zmu9atu85WyElUdnPKs5Ur/dVKMh51YUvcVL5Kq6oT+Hz1ICDnWmlyTyPLI/gr0z8AXU9rtrXS3HbyyP4KLqrooGlhNeTSnyzmmNbXFAEk7QcmiTaUto8vf6+tdHo+BDqiAEnWulsfRMj+CqNy+A/rQoKRbNb6NRkY8R1MrcD9AEEVecupORLP1KHkmc+SrjEtrCpVwkpYbHcqPf7DuaTrx1WI3M2CJz28aQM4+yRXQ0/8NfrbdXvHn9TNKOk/zjKwPsPDqD/zYvVkBIT1C0iVdySJP/d1Q1xuOw2hODLxweZyfcdS326u+NOmvO4PlG4gJP0Aqs3ImPK3BJI9Sa7AR+GX1XTyrqDpJR74Ik4/0Kngfhp9V4y972v9JKB42gScf6FdC0od73L06nWnytr+05Hajz3nEs7vCWsZSPQ1ak6ZmsjzrU4sJBOOw+ldlJ/Dt6lhpP8Aw20r4qex2SMY/wASrsT8P3qYlQ+a1vpdSQMAJRI/golWpHJnH6sGPcDxOKItjUhxtTy0kKGSjHNXHIY+baTDjIVg+YHvmuzZX4fXUB1o+DrDTHigEJKkyAM/4lUIH4eXVBlfiP650ryc+RMj/airRfUOBKv1Qcep3TkG5xn/ABUhe0lQwEhNX4GnVeN46207EICsBPrXVN0/Dq6pzHkONa90shIOcESf4KJ/+QB1QLIZ/u50wAUhKyEyPT28lDeuniODn0ekO1v5nG12bjKeUlzyFP5EIJJNDkwwsFMhp8LHPbPFdpO/h39Q3Hi9/dnpYnAxlEj+Crsf4Aeo7aiXNZaWORgYQ/x/kVMWKRyZSep4q8Lv7zh9y3oAQqIpalK4IUMbTX5NqvPZslXGTXasn8PTqW6vajW+lgkqyo+HIB/0Ktyfw+NfKiiOxrTTiCByra/z/k1AGojZMrt6pWSO0zhgfphvdkqwk45r6ZdzaIU5u5OAMZrtdP4eHUkMkL1tpYqxgDZIx/oVUZ/Dm6mpcDq9c6VUc9tsnA/yK8i068yhurqpM41el3EpKloUEqGcEelfrdcZNvlIlxlLQpJz5fWuzv8AzdfUxwr+Y1tpRQx5QEyeP8ivI/Dl6kJRhOtdKD28kj+Co3LVrgy9OtUsummEad6j2+UGos7elwgDcTxmnFubDmN/q1pVn+aad5P4a/VF1zxW9f6VbI7BKZP8FEbb+H71rt7gUjqLpQhPb/2nt/iVSuUauN7g+RVh2/FU2j+xmLX22uOtlaEK74BHpQGJLuNgcC28qTu/WDPJFdZw/gm6rJRtlay0ssE84TI5/rRX2d8CWtpaT/wr06FK75S//DRD+hkroxLblLWOx+RMJsnUBp0tgyQNvdtRwRTIvVbc1sqyjAPPPNOkj8PfqOXCWNbaZAPbKZAI/qTUB/D96yspUiL1K00gEY5En+ClT9OVWLK0FIqc9yTNrlqaFFSp/wCZbCAcE7u1I906pstyFsx5CFpQMFQPatpkfhx9YZJV4nUfSx3HPIlcn/EqmPwzuq+So6+0h5vzeSTz/kVGrpVRO7GkSwrHn/E5X1TrGXd3wlu5PoR9CQKGN2t+W0y+i4rcYKvNySR/bXWrn4ZPVdSdqNf6PT/1JP8ABVq1fhr9XLfb1xP7vtHlSiTnZK/gpqlGJjjx/iJs02v/APW85703MtwW3Z4UjxZQwSha/wAwrU7baQpKVIPb82T6/SnfTX4bPVa1ahbvM3XmknAgYw2mTn+1Fa5E+DnXjCcOap0+ffal7+Glj49d1/cdaPPiU+rZWpG/aYQ3bCBgJ7nFfrpbG4LzaAd5KcqynBSftXRCPhL1uhQKdS2HjBBw9nI/6tR3b4S+oNzd8ZzVOn95OSdr3p/1aYv6NSAKICVuuYlob/DxGOq18O0/+6AM/wDXrJfjscU38TeoSCSPlonH/wBuupfhG6H6j6VdQZtzvl3tkxudbzHQmIHNyVBW7J3AcYrOvij+FjW3VXrZe9aWPUtkhQ30MsJZlB3xAUIwSdqSMe3NLLCLrNmXmt68ftHnc41j3Jfh4GQcdvavr90UU7nFbiPrW5L+BXqnvBRrbTAx/RkfwUOuXwHdZXmVIh670kkn1cTJ/wBiKFtZ6+El2NUznRnO9+1UiOlaFcYHqazudf0yn1KGMe+6umLj+G515ujhVJ6laNCT6JMv/u6rI/DA6wHHidQ9Hn7fNf8Ad1HGp7n73mowjTSPvOa2ZSt4yokq7H0orCSp1aVrWpCUn0ODXSrH4bXV9kISdfaOwjj8sr/u6It/h0dWm8f+sDSh9/LJ/gps9ia4jEZFWvM5w22NUOSqTNf+ZCMttgZ3Kz6/uqW3tXKy2Z2W62FNTRtycHFdGn8O3quHy4jXek+RjlMn+CiCvgD6wKgiAdf6U8DOSnbJPP8AiVEW6IDfeS/UVHhT9JyQkeKQW8gnv61HLZXwkHynvXWcf8PXqowONb6TJ7flk/wV+f8Aw9eqbje0a40mD/zZP8FVowjRuo0oNAzj+RCCGvKkA9uPU0OLionmXk89vY12G5+HR1bWADr/AEkU5zjbJ/gqsv8ADb6ruZ3a+0icnPKJP8FFo6geYDZ1ANvZ4M5es0ta5QWhJWRg8CiU54Jmla0pO8ZIxXTlp/Ds6tW2Up4a80iRjGAiT/BXuX+HZ1XkPb06+0oAQRymT/BUzcvjcrXJq3yZiPSXVVg0RfpWob7oePq+OuGqOxDdfLXy7hP+EBA5rYuuGqdG641NprVuilOD5mxp/S8MklqI+MJS2gnk4Cef3UQtv4ePVe2nDfUHS6kE5I2yP4KaD8DHUZqaXI2stOIZwBsw/nsMn8lWrlOgKK57TxrfH4ivJxcO28ZJGn+o3MMS8Mf3qAFJHCSeKJN3SO+y21JUtCk87U9h78VtR+CLqJvCxq7TYI9Ql/8AhqRHwT9Ri7uc1lp4gdgEv/w1ULUU735nmsrJmKsTEtOK2JynuOOaY37c9DtjM65XCKVPqBTHYWHF7COSsj8p+lakz8GXUJtzcrVmniPoH/4avJ+D3XOFoOqbCAodwl7Of8WiEyK0BgxsRjx7Tn/5NsySpGNq1eX3A+tWG4amCJDaCrHGPet6jfB/rdo7l6osSjjA8r38NStfCLrtIAVqmw9zjCXu3+LVTWrsS5LwFPMwl6anKdowlQ8wr7KdjvtKcWsNICCDnuR9K2h/4OtfuPBaNVafA+oe/hq2PhC1xEVFm2/VVjE6K4h1KnUuqb3pIIO3byPoatxr62s7bTxKLrhWnevJivp3UPxC3jpim39LNK6Tu9gfaXbkzm5MdE11ISS5GKVkEq2q+/sKpaL0xard081d07XrHRrr10hw514u8xw+DpnbuSiOkK5dkFSCkbc7VA57iuiNTdIdctaJuMLTF40m7qC5yGpqn5dl+VjtStu1TyQySd+MAHA7c1hMz4CNWxVNsxtfWy5RpUYPzkzWnGiZqlKUsp2AhSMnIKvNyeKOyMwV0tbSABvzySdfuSOOPp+xEV4KV5blLz26PGh9ffczbUfVzWmrukVg0Zqe6Rrva9PXbxzNeUVyp6UcNJcbIwlsAenJzzXyy6w1hLuGp/igRd7fbYuhGUW2C280rZcJL6QhMOMADs2gZyORTwr4GerPy4js650s2nnPkkHP+RXxfwO9aXNLp0YrqRpwWRM9N0+RAkeEZQ7O42d6XY2eKu7YBJGgDvQ2eTrx4miyMDGCCqpuN88ckD7zmJDUvU99naguJ/Xy3lPvK7kqJ98DP39e9XblaUx0NNl0krV3x6V03aPgW6jW1pLR1lptY5KztfyT/i1aunwS9RpqEhvVumkqHHmS/j/QqhrkJ5hwyk0E3wJywEpjL8FIKyOywMiqsiJMcWVKcB3c4A7V1Wz8DGv47RS3q3Tm89yQ/j/Rr8fgY6gllYGrtNhShwdr/H+TUO9NbJnP1yCzSTkgqCAW3E5Un6UNlRWJTnjN7mnEeqR3rqVP4fvVUvLcXrrSpCjn8sjOP8SrTPwA9SE5CtZ6XI+iJH8FDOUaMl6jUvk8zlMTbrF2h54PMJHmyfMPtV6FdYc5expZ3A8g8YrqCR8AfUdxoob1jpfJwDuTI/hoDL/Do6srkJkRdeaSb82VAiTz/kUK4CEdsoszabtiYo47HQx4sdwqSO+RVdL4IKuQe9dIR/gI6pNRFR3NbaVORxhMnv8A4lRtfAF1RbSQdb6WV90yP4KtAB5gYvqHwsZz34nzEbnlQOM0btDBQlltKkjBz++tuZ+Afqk2T/w40vtznATI/go7B+CLqJFcS4rV+nDggnAf/hoPNHf2gQDKuUKQpiJZ0rRHyo549KYbFDVKVMa4J+XLgOcYxWlQfhT1vFaSyrUtjO0dwHv4aux/hh1mwFY1LZ8qGDgOj/8AzWgxMhVXR+kxOXS7NsTC30sAONyE+IhXb3Sfenn4b2w11jtIbUSgR5fJHf8AUqpxX8KmtXHATqWyYzzw7n/Rpn6V/D3qjQmv4Wp518tT8SM0+hTbKXPEJWgpGMgDufeltnaSTJV9/cAZ/9k="/>
  13.  
  14. In the above instance of scaling, the 2 rectangles are similar as a result of their basic shapes are the same even when one is smaller and the other is bigger. Once you complete the steps, the display will flash a "Please wait" message to apply the model new text size. After you complete the steps, the system will apply the setting you specified. You should not change the dimensions settings utilizing customized values as a result of it affects the viewing experience. However, if it's a necessity, and you do it appropriately, it could help you hit that candy spot. For instance, we now have to assemble a bedroom of measurement a hundred and eighty inches by 168 inches.
  15. You can at all times revert the modifications utilizing the identical directions outlined above, however in step 4, click on the "Turn off custom scaling and signal out" option.
  16. We want to attract its blueprint first to set up the furnishings, like bed, nightstands, etc. So, we are going to scale down the bed room to fifteen inches by 14 inches. If you wish to make the text extra readable, you shouldn't adjust the scale settings. If the system isn't scaling components correctly, repeat the steps to select a unique value to increase or lower the scaling worth till you reach the correct configuration.
  17. If you connect an external monitor, utilizing a custom scale setting may help improve the scale of the textual content, icons, and menus throughout the shows. Changing the display scale may enhance content visibility while showing a PowerPoint presentation on a projector. Scale is the ratio to symbolize the relation between the scale of a model or scaled figure and the corresponding dimensions of the particular figure or an object.
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