Let f(x) be a differentiable function on...

Let `f(x)` be a differentiable function on `[0,8]` such that `f(1)=3, f(2)=1//2, f(3) =4, f(4)=-2, f(5)=6`
`f(6)=1//3, f(7)=-1//4`. Then the minimum no. points of interaction of the curve `y=f^(')(x)` and `y=f^(')(x)(f(x))^(2)` is `K` then `K-5=`

Similar Questions

Explore conceptually related problems

Let y=f(x) be a differentiable function such that f(-1)=2,f(2)=-1 and f(5)=3 then the equation f'(x)=2f(x) has

If f is twice differentiable function for x in R such that f(2)=5,f'(2)=8 and f'(x) ge 1,f''(x) ge4 , then

Let y=f(x) be a differentiable function such that f(−1)=2,f(2)=−1 and f(5)=3 If the equation f (x)=2f(x) has real root. Then find f(x)

Given that f(x) is a differentiable function of x and that f(x) ,f(y) = f(x) + f(y) +f(xy) -2 and that f(1)=2 , f(2) = 5 Then f(3) is equal to

Let f(x) be a function such that f(x).f(y)=f(x+y) , f(0)=1 , f(1)=4 . If 2g(x)=f(x).(1-g(x))

Let f(x) be an even function & even degree polynomial such that f((1)/(2))=(1)/(2),f(1)=1,f(2)=-3,f(3)=5 then minimum number of points of inflection for f(x) is

Let `f(x)` be a differentiable function on `[0,8]` such that `f(1)=3, f(2)=1//2, f(3) =4, f(4)=-2, f(5)=6` `f(6)=1//3, f(7)=-1//4`. Then the minimum no. points of interaction of the curve `y=f^(')(x)` and `y=f^(')(x)(f(x))^(2)` is `K` then `K-5=`

Similar Questions

Recommended Questions

Let `f(x)` be a differentiable function on `[0,8]` such that `f(1)=3, f(2)=1//2, f(3) =4, f(4)=-2, f(5)=6`
`f(6)=1//3, f(7)=-1//4`. Then the minimum no. points of interaction of the curve `y=f^(')(x)` and `y=f^(')(x)(f(x))^(2)` is `K` then `K-5=`