find the ratio of base edge,slant height of a squre pyramidwith all its edges equal
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hllo FRIEND...❤️
Consider a pyramid with an equilateral triangle as its base. Suppose each side of the base is aaand each slant edge is ss. How to find the height, hh.
if the base is a square, we can use the following approach.
Suppose the base is a square with each side aaand slant edge ss. Then we can easily find the diagonal(dd) of the base from sides. then there is a right angled triangle where (d/2)2+h2=s2(d/2)2+h2=s2
So, there might be a similar approach but i am not able to find how this concept can be applied when the base is an equilateral triangle.
We may be able to use the same concept.
first find height of the base, hbhb using the formula 3–√a23a2.
then use the formula for Centroid, cc = 2h132h13.
now use c2+h2=s2c2+h2=s2. is this a correct solution?
hope its help U my friend..❤️❤️
Consider a pyramid with an equilateral triangle as its base. Suppose each side of the base is aaand each slant edge is ss. How to find the height, hh.
if the base is a square, we can use the following approach.
Suppose the base is a square with each side aaand slant edge ss. Then we can easily find the diagonal(dd) of the base from sides. then there is a right angled triangle where (d/2)2+h2=s2(d/2)2+h2=s2
So, there might be a similar approach but i am not able to find how this concept can be applied when the base is an equilateral triangle.
We may be able to use the same concept.
first find height of the base, hbhb using the formula 3–√a23a2.
then use the formula for Centroid, cc = 2h132h13.
now use c2+h2=s2c2+h2=s2. is this a correct solution?
hope its help U my friend..❤️❤️
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