Find the altitude of the sun, if shadow of a vertical pole is `1/sqrt3` of its original heigths

Find the angle of elevation of the sun (suns altitude) when the length of the shadow of a vertical pole is equal to its height.

Find the angle of elevation of the sun (sun’s altitude) when the length of the shadow of a vertical pole is equal to its height.

Let alpha be the solution of 16^(sin^2 theta)+ 16^(cos^2 theta)=10 in (0,pi//4) . If the shadow of a vertical pole is 1/sqrt3 of its height , then the altitude of the sun is

Let alpha be the solution of 16^(sin^2 theta)+ 16^(cos^2 theta)=10 in (0,pi//4) . If the shadow of a vertical pole is 1/sqrt3 of its height , then the altitude of the sun is

The length of the shadow of a vertical pole is 1/sqrt3 times its height. Find the angle of elevation .

The length of the shadow of a vertical pole is 1/sqrt3 times its height. Find the angle of elevation .

What is the angle of elevation of the Sun when the length of the shadow of a vertical pole is equal to its height?

What is the angle of elevation of the Sun when the length of the shadow of a vertical pole is equal to its height?

The angle of elevation of the sun when the length of the shadow of a vertical pole is equal to its height is 45^(@) .