If `z= x- iy and z^(1//3)= p+iq`, then `((x)/(p) + (y)/(q))//(p^(2) + q^(2))` is equal to

If z=x-iy and z^(1/3)=p+iq , then (1)/(p^(2)+q^(2))((x)/(p)+(y)/(q)) is equal to

|(1,1,1),(p,q,r),(p,q,r+1)| is equal to

int(px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1)dx is equal to

If y= 4x -5 is a tangent to the curve y^(2) = px^(3) + q at (2,3) then (p+q) is equal to a)-5 b)5 c)-9 d)9

If p and q are non-collinear unit vectors and | p+q| = sqrt(3) , then (2p - 3q) . (3p + q) is equal to

If AM and GM of x and y are in the ratio p: q, then x: y is : a) p - sqrt(p^(2)+ q^(2)) : p +sqrt (p^(2)+ q^(2)) b) p +sqrt(p^(2) - q^ (2) ) : p- sqrt(p^(2)-q^(2)) c) p : q d) p + sqrt(p^(2) + q^(2)) : p-sqrt(p^(2) + q^(2))

If the lines (2x-1)/(2) = (3-y)/(1) = (z-1)/(3) and (x+3) /(2) = (z+1)/(p) = (y+2)/(5) are perpendicular to each other, then p is equal to a) 1 b) -1 c) 10 d) - (7)/(5)

Let x_1 and y_1 be real numbers. If z_1 and z_2 are complex numbers such that |z_1| = |z_2|=4 , then |x_1 z_1 - y_1 z_2|^(2) + |y_1 z_1 + x_1 z_2 |^(2) is equal to