the answer is D. image layer but i may be wrong
here angle q=110 then angle a+angle b=180 degree angle p=70 degree
Explanation:
angle p= 70 degree
angle q=110 degree
angle r= 70 degree
angle s=110 degree
Answer:
1: it helps us express ourself
2: it inspires people
3: it moves us
4: it allows you to search for new ideas
5: it makes us more tolerant
Explanation:
<span>The photographs taken with a 3D microscope are different to those taken with a regular camera because the intention for images taken with each are different. Photographs taken with a microscope are intended to be used for studying something too small to be seen with the huma eye, and show the ridges, peaks and valleys of whatever the photo has been taken of.</span>
Contour line details given in the following
Explanation:
- A contour line is a line which defines a form or an edge. It is, essentially, the outline or silhouette of a given object or figure. Additionally, contour lines can be used to show any dramatic changes of plane within the object or form (like the inner seams within the structure of a shoe, for example).
- A contour line (also isoline, isopleth, or isarithm) of a function of two variables is a curve along which the function has a constant value, so that the curve joins points of equal value.
- Topographic maps also have a vertical scale to allow the determination of a point in three dimensional space. Contour Lines: Contour lines are used to determine elevations and are lines on a map that are produced from connecting points of equal elevation (elevation refers to height in feet, or meters, above sea level).
- There are 3 kinds of contour lines you'll see on a map: intermediate, index, and supplementary.
- The thin brown lines snaking around a topographic map are called contour lines. All points along the same contour line are at the same elevation above sea level.
- Other characteristics of contour lines are:
- - Uniform slopes have uniformly spaced lines. - Along plane surfaces, contour lines are straight and parallel. - Contour lines are perpendicular to lines of steepest slopes. - For summits or depressions, contour lines most close upon themselves.
