For `y=f(x)=overset(x)underset(0)int 2|t|`dt, the tangent lines parallel to the bi-sector of the first quadrant angle are

For y=f(x)=int_(0)^(x) 2|t| dt, the tangent lines parallel to the bi-sector of the first quadrant angle are

For y=f(x)=int_(o)^(x)2|t|dt, the tangent lines parallel to the bisector of the first quadrant angle are (A)y=x+-(1)/(4)(B)y=x+-(3)/(2)(C)y=x+-(1)/(2)(D) None of these

Let f(x)=int_(0)^(1)|x-t|dt, then

Consider f(x)=int_(1)^(x)(t+(1)/(t))dt and g(x)=f'(x) If P is a point on the curve y=f(x) such that the tangent to this curve at P is parallel to the chord joining the point ((1)/(2),g((1)/(2))) and (3,g(3)) of the curve then the coordinates of the point P

If f(x)=int_(0)^(x)tf(t)dt+2, then

the equation of the line parallel to the line 3x+4y=0 and touching the circle x^(2)+y^(2)=9 in the first quadrant is:

The intercepts made by the tangent to the curve y=int_(0)^(x) |t| dt, which is parallel to the line y=2x on y-axis are equal to

A tangent to the curve y= int_(0)^(x)|x|dt, which is parallel to the line y=x, cuts off an intercept from the y-axis is equal to