Home
Class 10
MATHS
If the angle of elevation of a cloud fro...

If the angle of elevation of a cloud from a point 'h' meterss above a take is `theta_(1)` and the angle of depression of its reflection in the take is `theta_(2)`. Prove that the height that the cloud is located from the ground is `(h(tan theta(1)+tan theta_(2)))/(tan theta_(2)-tan theta_(2))`.

Promotional Banner

Topper's Solved these Questions

  • TRIGONOMETRY

    PREMIERS PUBLISHERS|Exercise SOLUTION TO EXERCISE 6.5|15 Videos

  • TRIGONOMETRY

    PREMIERS PUBLISHERS|Exercise SOLUTION TO UNIT EXERCISE|10 Videos

  • TRIGONOMETRY

    PREMIERS PUBLISHERS|Exercise SOLUTION TO EXERCISE 6.3|6 Videos

  • STATISTICS AND PROBABILITY

    PREMIERS PUBLISHERS|Exercise OTHER IMPORTANT OBJECTIVE TYPE QUESTIONS|23 Videos

Similar Questions

Explore conceptually related problems

Prove: sec theta + tan theta = 1/(sec theta - tan theta)

Solve tan theta+tan 2 theta+sqrt(3) tan theta tan 2 theta = sqrt(3) .

Prove that (sec 8theta-1)/(sec 4 theta -1) = (tan 8theta)/(tan 2theta)

Prove: (sin theta + tan theta)/(cos theta) = tan theta (1 + sec theta)

Prove that cot theta-tan theta=2cot 2 theta .

If tan theta+cot theta=3, then tan^(2) theta+cot^(2) theta= ____.

The general solution of tan theta+tan 2 theta+tan 3 theta=0 is

Prove the following: (tan^3 theta - 1)/(tan theta - 1) = sec^2 theta + tan theta

IF tan 2 theta . Tan theta = 1 then theta is

Prove: (1 + tan^2 theta)(1+sin theta)(1-sin theta) = 1