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How To Regulate Display Scale Settings In Windows

From Reilly Lester, 2 Days ago, written in Plain Text.
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  1. You can all the time revert the changes utilizing the same instructions outlined above, but in step 4, click on the "Turn off customized scaling and signal out" choice.
  2.  The Means To Make Text Larger Without Altering Scale Settings On Home Windows Eleven
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  4. Scale issue, on the other hand, is a quantity by which all of the elements of an object are multiplied in order to create an enlarged or lowered determine. Scale and scale factor are principally used in blueprints that are used for the development of buildings. Once you full the steps, the model new scale configuration will apply.
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  6. Scaling is used when the dimensions of any geometrical determine or shape or an object could be modified with respect to its unique measurement. When issues are too giant, we use scale components to calculate smaller measurements. When things are too small, we use scale factors to calculate greater measurements. Scale factor, on the other hand, is a number that is used to extend or lower the size of a determine.
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  8. Although it's not required, you could must restart the pc to make sure the setting applies appropriately for all supported functions. For example, we've to attract a butterfly on a chunk of paper so as to research its components. Since the butterfly is small in size, we would prefer to scale it up, as proven beneath.
  9. scaling and polishing price Singapore " 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"/>
  10. The scale factor could be calculated if the dimensions of the original determine and the dimensions of the increased or decreased figures are identified. You should be questioning what does scaling imply in Math? Scaling is a procedure by way of which we draw an object that's proportional to the precise dimension of the object. Scaling in geometry means that we're both enlarging or shrinking figures in order that they keep their basic shape. When we scale figures, they're known as related figures. For instance, if you don't have good eyesight, making the elements bigger on the display may make things simpler to see and use, avoiding stressing your eyes.
  11.  The scale issue can be calculated if the scale of the original determine and the dimensions of the elevated or decreased figures are known. So, we'll scale down the bed room to 15 inches by 14 inches. You can all the time revert the adjustments using the same directions outlined above, but in step 4, click on the "Turn off custom scaling and signal out" possibility. Once you full the steps, the display will flash a "Please wait" message to apply the brand new text size. In this how-to guide, I will explain tips on how to change the scale settings on a desktop monitor or laptop computer display.
  12.  What Does 'scale The Enterprise' Mean?
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  14. We need to draw its blueprint first to arrange the furniture, like bed, nightstands, etc. So, we are going to scale down the bed room to fifteen inches by 14 inches. If you want to make the text more readable, you shouldn't regulate the size settings. If the system isn't scaling parts correctly, repeat the steps to select a unique worth to increase or lower the scaling value until you reach the right configuration.
  15. In this how-to guide, I will explain how to change the dimensions settings on a desktop monitor or laptop display. If parts are too small and text too hard to learn, you probably need to adjust the dimensions settings. Find related words to scaling using the buttons beneath. All content material on this web site, including dictionary, thesaurus, literature, geography, and different reference data is for informational purposes only. This data shouldn't be thought of full, up to date, and is not meant for use instead of a go to, consultation, or recommendation of a authorized, medical, or some other professional.
  16. In the above instance of scaling, the 2 rectangles are comparable as a end result of their primary shapes are the identical even when one is smaller and the opposite is bigger. Once you complete the steps, the display will flash a "Please wait" message to apply the new text dimension. After you complete the steps, the system will apply the setting you specified. You shouldn't change the size settings using customized values as a result of it affects the viewing expertise. However, if it is necessary, and also you do it appropriately, it could assist you to hit that candy spot. For example, we have to construct a bed room of size a hundred and eighty inches by 168 inches.
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