Find the equation of tangent to the `y = F(x)` at `x = 1`, where `F(x) = int_(x)^(x^(3))(dt)/(sqrt(1+t^(2)))`

The equation of tangent to the curve y=int_(x^(2))^(x^(3))(dt)/(sqrt(1+t^(2))) at x=1 is sqrt(3)x+1=y (b) sqrt(2)y+1=x sqrt(3)x+y=1(d)sqrt(2)y=x

If y =int _(u(x))^(v(x))f(t) dt , let us define (dy)/(dx) in a different manner as (dy)/(dx) = v'(x) f^(2)(v(x)) - u'(x) f^(2)(u(x)) alnd the equation of the tangent at (a,b) as y -b = (dy/dx)_((a,b)) (x-a) If F(x) = int_(1)^(x)e^(t^(2)//2)(1-t^(2))dt , then d/(dx) F(x) at x = 1 is

If f(x)=int_(2)^(x)(dt)/(1+t^(4)) , then

Find the equation of tangent to y=int_(x^(2))^(x^(3))(dt)/(sqrt(1+t^(2))) at x=1

The equation of the tangent to the curve y= int_(x^4)^(x^6) (dt)/( sqrt( 1+t^2) ) at x=1 is

equation of tangent to y=int_(x^(2)rarr x^(3))(dt)/(sqrt(1+t^(2))) at x=1 is:

f(x)=int_(0)^(x^(2))((sin^(-1)sqrt(t))^(2))/(sqrt(t))dt