Given f'' (x) = 6x + 6 , f'(0) = -5 and ...

Given `f'' (x) = 6x + 6 , f'(0) = -5 and f(1) = 6` find `f(x)`.

Verified by Experts

The correct Answer is:

`x^3 - 3x^2 - 5x + 7`

INTEGRAL CALCULUS
FULL MARKS|Exercise EXERCISE 11.1|4 Videos
INTEGRAL CALCULUS
FULL MARKS|Exercise EXERCISE 11.2|5 Videos
INTEGRAL CALCULUS
FULL MARKS|Exercise EXERCISE - 11.13|23 Videos
EXAMINATION QUESTION PAPER MARCH 2019
FULL MARKS|Exercise MATHEMATICS|49 Videos
INTRODUCTION TO PROBABILITY THEORY
FULL MARKS|Exercise ADDITIONAL PROBLEM|17 Videos

Similar Questions

Explore conceptually related problems

If f''(x) = 12x - 6 and f(1) = 30 , f' (1) = 5 find f(x)

If f''(x) = 12 x - 6 and f(1) = 30 , f'(1) = 5 find f (x) .

Given f'(x)=4x-5 and f(2)=1 , find f(x)

If f'(x) = 9 x^(2) - 6 x and f (0) = - 3 , find f(x)

If f''(x)=12x-6 and f(1)=30, f'(1)=5 find f(x) .

Consider f:{4,5,6}->{p ,q, r} given by f(4)=p , f(5)=q and f(6)=r . Find f^(-1) and show that (f^(-1))^(-1)=f .

f(x)=x^(4)-6x^(2) find f'(x) .

If a function 'f' satisfies the relation f(x)f^('')(x)-f(x)f^(')(x) -f^(')(x)^(2)=0 AA x in R and f(0)=1=f^(')(0) . Then find f(x) .