Prove that the distance of the point `(a cos alpha, a sin alpha)` from the origin is independent of `alpha`

Distance of the point (alpha,beta,gamma) from Y- axis is …........

Find distance PQ between the points P ( a cos alpha, a sin alpha) and Q ( a cos beta, a sin beta) .

The expression nsin^(2) theta + 2 n cos( theta + alpha ) sin alpha sin theta + cos2(alpha + theta ) is independent of theta , the value of n is

Obtain equation of circle in Centre (sqrt(-4)cos alpha, 4 sin alpha) and radius 5.

If alpha=e^(i2pi//7)a n df(x)=a_0+sum_(k=1)^(20)a_k x^k , then prove that the value of f(x)+f(alpha, x)++f(alpha^6x) is independent of alphadot

The expression (sin(alpha+theta)-"sin"(alpha-theta))/(cos(beta-theta)-cos(beta+theta)) is - independent of alpha b. independent of beta c. independent of theta d. independent of alpha\ a n d\ beta

if [ ( cos alpha, - sin alpha),(sin alpha, cos alpha)] and A +A^1 =I then alpha =……

If sin (3alpha) /cos(2alpha) < 0 If alpha lies in

A jet plane is at a vertical height of h. The angles of depression of two tanks on the ground in the same line with the plane are alpha and beta (alpha gt beta) . Prove that the distance between the tanks is ( h (tan alpha - tan beta))/(tan alpha tan beta)