The slope of the normal to the curve `x = t^(2) + 3t - 8 and y=2t^(2) - 2t - 5` at the point `(2, -1)` is a)`6/7` b)`-(6)/(7)` c)`7/6` d)`- (7)/(6)`

The slope of the normal to the curve y^(3)-xy-8=0 at the point (0, 2) is equal to a)-3 b)-6 c)3 d)6

The focus of the parabola y^(2) + 6x - 2y + 13 = 0 is at the point a) ((7)/(2), 1) b) ((-1)/(2),1) c) (-2,(1)/(2)) d) (-(7)/(2),1)

What is the slope of the line joining the points (2,7) and (6,4)?

The equation of the tangent to the curve x = (t - 1)/(t + 1), y = (t + 1)/(t - 1) at t = 2 is a) x + 9y - 6 = 0 b) 9x - y - 6 = 0 c) 9x + y + 6 = 0 d) 9x + y - 6 = 0

If the angle between the curves y=2^(x) and y=3^(x) is alpha , then the value of tan alpha is equal to a) (log((3)/(2)))/(1+(log2)(log3)) b) (6)/(7) c) (1)/(7) d) (log(6))/(1+(log2)(log3))

If the equations of the tangent to the circle x^(2)+ y^(2)- 2x + 6y -6 =0 parallel to 3x - 4y + 7=0 is 3x - 4y +k=0 , then the values of k are : a) 5,-35 b) -5,35 c) 7,-32 d) -7,32

Consider the points A(2,2,-1), B(3,4,2), C(7,0,6).Find AB.

If x^2+y^2=t -1/t and x^4+y^4=t^2+1/t^2 then (dy)/ (dx) is equal to a) 1/(x^2y^3) b) 1/(xy^3) c) 1/(x^2y^2) d) 1/(x^3y)