If x,y,z are in G.P. and `a^(x)=b^(y) =c^(z)` then

If a ,b,c are in G.P. and a^(x) =b^(y) =c^(z) then x,y,z are in

If a, b, c are in AP and a^(1/x)=b^(1/y)=c^(1/z) prove that x, y, z are in AP.

If x,y, and z are in A.P ax , by and cz are in G.P. and a,b,c are in HP then prove that (x)/(z) +(z)/(x) = (a)/ (c )+(c )/(a)

If x,y,z are in A.P., then the value of the determinant |(a+2,a+3,a+2x),(a+3,a+4,a+2y),(a+4,a+5,a+2z)| is a)1 b)0 c)2a d)a

If a,b,c are in G.P. with common ratio r_(1) and alpha , beta, gamma are in G.P. with common ratio r_(2) , and equations ax + alpha y + z = 0, bx + beta y + z = 0, cx + gamma y + z = 0 have only zero solution. Then which of the following is not true. a) r_(1)!=1 b) r_(2)!=1 c) r_(1)!=r_(2) d)None of these

If sin(y+z-x),sin(z+x-y),sin(x+y-z) are in A.P ., then tan x , tan y , tan z are in

If the mth, nth and pth terms of an A.P. and G.P.be equal and be respectively x, y, z then prove that x^(y-z) y^(z-x) z^(x-y)=1

Let R be the relation on the set Z of all integers defined by R={(x, y) : x,y in Z,x-y is divisible by n}.Prove that i) (x, x) in R for all x in , Z ii) (x, y) in R implies that (y, x) in R for all x, y in Z iii) (x, y) in R and (y, z) in R implies that (x, z) in R for all x, y, z in Z