MLX Paste

The Way To Regulate Show Scale Settings In Home Wi

From Keller Barr, 2 Days ago, written in Plain Text.
URL https://mlx.su/paste/view/936ab3bf
Embed
Download Paste or View Raw
  1. If you connect an exterior monitor, utilizing a customized scale setting can help increase the dimensions of the textual content, icons, and menus throughout the shows. Changing the display scale may improve content material visibility whereas showing a PowerPoint presentation on a projector. Scale is the ratio to characterize the relation between the size of a mannequin or scaled figure and the corresponding dimensions of the particular determine or an object.
  2.  
  3. The scale issue can be calculated if the size of the original determine and the scale of the increased or decreased figures are recognized. You must be wondering what does scaling mean in Math? Scaling is a procedure via which we draw an object that is proportional to the precise dimension of the object. Scaling in geometry implies that we're both enlarging or shrinking figures so that they keep their primary form. When we scale figures, they are generally recognized as comparable figures. For example, when you wouldn't have excellent eyesight, making the weather greater on the display screen might make things easier to see and use, avoiding stressing your eyes.
  4.  Once you complete the steps, the new scale configuration will apply. Scaling in geometry implies that we're either enlarging or shrinking figures in order that they preserve their primary form. When things are too small, we use scale factors to calculate larger measurements. Scaling is a procedure through which we draw an object that's proportional to the precise dimension of the thing. Scale is the ratio to represent the relation between the dimensions of a mannequin or scaled determine and the corresponding dimensions of the actual figure or an object.
  5. In this how-to information, I will clarify how to change the size settings on a desktop monitor or laptop computer show. If components are too small and text too onerous to read, you probably want to regulate the scale settings. Find comparable words to scaling utilizing the buttons beneath. All content on this website, together with dictionary, thesaurus, literature, geography, and other reference knowledge is for informational purposes solely. This information shouldn't be thought-about complete, up to date, and is not intended for use rather than a go to, consultation, or advice of a legal, medical, or some other skilled.
  6. We need to attract its blueprint first to set up the furnishings, like bed, nightstands, and so forth. So, we will scale down the bed room to fifteen inches by 14 inches. If you want to make the text extra readable, you shouldn't modify the scale settings. If the system isn't scaling elements accurately, repeat the steps to select a unique value to extend or decrease the scaling value till you attain the proper configuration.
  7.  
  8. Although it is not required, you may must restart the pc to verify the setting applies accurately for all supported applications. For example, we've to draw a butterfly on a piece of paper to have the ability to examine its components. Since the butterfly is small in size, we would like to scale it up, as shown below.
  9.  
  10.  Other Word Types Of Scaling
  11. Scale issue, on the opposite hand, is a number by which all the parts of an object are multiplied in order to create an enlarged or reduced determine. Scale and scale factor are mostly utilized in blueprints that are used for the construction of buildings. Once you complete the steps, the new scale configuration will apply.
  12.  What Does 'scale The Enterprise' Mean?
  13. Scaling is used when the size of any geometrical figure or form or an object may be modified with respect to its original measurement. When things are too massive, we use scale elements to calculate smaller measurements. When issues are too small, we use scale factors to calculate bigger measurements. Scale factor, then again, is a quantity that is used to extend or decrease the size of a figure.
  14.  
  15. scaling and polishing price Singapore " src="data:image/jpeg;base64,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"/>
  16. You can all the time revert the adjustments using the same directions outlined above, but in step 4, click the "Turn off customized scaling and signal out" possibility.
  17. In the above example of scaling, the 2 rectangles are comparable because their primary shapes are the identical even when one is smaller and the other is bigger. Once you complete the steps, the display screen will flash a "Please wait" message to use the brand new text size. After you complete the steps, the system will apply the setting you specified. You should not change the size settings using custom values because it impacts the viewing expertise. However, if it is necessary, and also you do it accurately, it might assist you to hit that candy spot. For instance, we have to construct a bedroom of dimension a hundred and eighty inches by 168 inches.
  18. My website:

Reply to "The Way To Regulate Show Scale Settings In Home Wi"