derivative of `sqrt(ax^2+bx+c)`

The family of anti-derivatives of f(x)=(1)/(ax^(2)+2sqrt(ab)x+b+1) is

Euler's substitution: Integrals of the form intR(x, sqrt(ax^(2)+bx+c))dx are claculated with the aid of one of the following three Euler substitutions: i. sqrt(ax^(2)+bx+c)=t+-x sqrt(a)if a gt 0 ii. sqrt(ax^(2)+bx+c)=tx+-x sqrt(c)if c gt 0 iii. sqrt(ax^(2)+bx+c)=(x-a)t if ax^(2)+bx+c=a(x-a)(x-b) i.e., if alpha is real root of ax^(2)+bx+c=0 (xdx)/(sqrt(7x-10-x^(2))^3) can be evaluated by substituting for x as

If 1,2,3 are the roots of ax^3 +bx^2 + cx +d=0 then the roots of ax sqrt(x) + bx +c sqrt (x ) +d=0 are

If the function and the derivative of the function f(x) is everywhere continuous and is given by f(x)={:{(bx^(2)+ax+4", for " x ge -1),(ax^(2)+b", for " x lt -1):} , then

int (ax^2+bx+c)dx =

Find the derivative of the following functions (it is to be understand that a,b,c,d,p,q,r and s are fixed non-zero constants and m and n are integers): (1)/(ax^(2)+bx+c)

Find the derivative of the following function with respect to 'x' e^(ax).sin^-1bx

Differentiate sin^(n)(ax^(2)+bx+c)

if alpha&beta are the roots of the quadratic equation ax^2 + bx + c = 0 , then the quadratic equation ax^2-bx(x-1)+c(x-1)^2 =0 has roots

If the roots of the equation ax^2 + bx + c = 0, a != 0 (a, b, c are real numbers), are imaginary and a + c < b, then