Let `y=f(x)` be an even function, If `f'(2)=-sqrt(3)` then the inclination of the tangent to the curve `y=f(x)` at `x=-2` with the `x` -axis is
1) `(pi)/(6)`
2) `(pi)/(3)`
3) `(2 pi)/(3)`
4) `(5 pi)/(6)`

The inclination of the tangent to the curve y^(2)=4x drawn at the point (-1 2) is (A) (pi)/(3) (B) (pi)/(6) (C) (pi)/(4) (D) (pi)/(2)

The inclination of the tangent to the curve y^(2)=4x drawn at the point (-1 2) is (A) (pi)/(3) (B) (pi)/(6) (C) (pi)/(4) (D) (pi)/(2)

If the inclination of the normal to the curve y=f(x) at the point (5,6) makes an anlge of (2pi)/(3), then f'(5)=

Angle between the tangents to the curve y=x^(2)-5x+6 at the points (2,0) and (3,0) is : (a) (pi)/(3) (b) (pi)/(2)( c) (pi)/(6) (d) (pi)/(4)

The angle between the tangents to the curve y=x^(2)-5x+6 at the point (2,0) and (3,0) is (pi)/(2) (b) (pi)/(3) (c) pi (d) (pi)/(4)

Let f :[0,2p] to [-3, 3] be a given function defined at f (x) = cos ""(pi)/(2). The slope of the tangent to the curve y = f^(-1) (x) at the point where the curve crosses the y-axis is:

Let f (x) be a continous function such that the area bounded by the curve y =f (x) x-axis and the lines x=0 and x =a is (a ^(2))/( 2) + (a)/(2) sin a+ pi/2 cos a, then f ((pi)/(2)) is

Let f(x) be a non-negative continuous function such that the area bounded by the curve y=f(x), the x -axis,and the ordinates x=(pi)/(4) and x=beta>(pi)/(4) is beta sin beta+(pi)/(4)cos beta+sqrt(2)beta Then f'((pi)/(2)) is ((pi)/(2)-sqrt(2)-1)( b) ((pi)/(4)+sqrt(2)-1)-(pi)/(2)( d) (1-(pi)/(4)-sqrt(2))

Let f(x) be a non-negative continuous function such that the area bounded by the curve y=f(x), the x-axis, and the ordinates x=(pi)/(4) and x=betagt(pi)/(4)" is "beta sin beta +(pi)/(4)cos beta +sqrt(2)beta. Then f'((pi)/(2)) is

The range of f(x)=cot^(-1)(log_(1/2)(x^(4)-2x^(2)+3)) is ( (pi)/(2) (3 pi)/(4) 0 (3 pi)/(4) pi) (0 (3 pi)/(4)