" Value of "k" so that "f(k)=int(0)^(4)|...

" Value of "k" so that "f(k)=int_(0)^(4)|4x-x^(2)-k|dx" is minimum is "

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

Number of integral values of k so that int_(1)^(k)(1+(3x-2)/(2sqrt(x)))dx<4sqrt(k)

If f(k - x) + f(x) = sin x , then the value of integral I = int_(0)^(k) f(x)dx is equal to

If f(k - x) + f(x) = sin x , then the value of integral I = int_(0)^(k) f(x)dx is equal to

The value of k + f(0) so that f (x)={{:((sin (4k-1)x)/(3x)"," , x lt 0),((tan (4k +1)x )/(5x)"," , 0 lt x lt (pi)/(2)), ( 1"," , x =0):} can bemade continous at x=0 is:

The value of k + f(0) so that f (x)={{:((sin (4k-1)x)/(3x)"," , x lt 0),((tan (4k +1)x )/(5x)"," , 0 lt x lt (pi)/(2)), ( 1"," , x =0):} can bemade continous at x=0 is:

If int_(0)^(1)(3x^(2)+2x+k)dx=0, find the value of k.

If int_(0)^(1)(3x^(2)+2x+k)dx=0, find the value of k.

Recommended Questions

" Value of "k" so that "f(k)=int(0)^(4)|4x-x^(2)-k|dx" is minimum is "
Text Solution
|
Let (d)/(dx)(F(x))=(e^(sin x))/(x),x>0. If int(1)^(4)2(e^(sin(x^(2))))...
Text Solution
|
If a function is defined such as f(x+k)=f(x) for k in I^(+) and I=int(...
Text Solution
|
Value of k' so that f(k)=int(0)^(4)|4x-x^(2)-k|dx is minimum is-
Text Solution
|
Given A={f:C[0,1]:int(0)^(1)f(x)dx=1} then minimum value of int(0)^(1)...
Text Solution
|
If int(0)^(npi) f(cos^(2)x)dx=k int(0)^(pi) f(cos^(2)x)dx, then the va...
Text Solution
|
If int(0)^(pi) x f (cos^(2) x + tan ^(4) x ) dx = k int(0)^(pi//2) f...
Text Solution
|
Number of integral values of k so that int(1)^(k)(1+(3x-2)/(2sqrt(x)))...
Text Solution
|
If int(0)^(1)(tan^(-1)x)/(x)dx=k int(0)^( pi/2)(x)/(sin x)dx then the ...
Text Solution
|