`f(x) = sqrtx, a = 1, b = 4` find c in Lagrange's mean value theorm:

Consider the function f(x)=8x^2-7x+5 on the interval [-6,6]dot Find the value of c that satisfies the conclusion of Lagranges mean value theorem.

The value of c in Lagrange's mean value theorem for the function f(x) = x^(2) + 2x -1 in (0, 1) is

Given f(x)=4-(1/2-x)^(2/3),g(x)={("tan"[x])/x ,x!=0 1,x=0 h(x)={x},k(x)=5^((log)_2(x+3)) Then in [0,1], lagranges mean value theorem is not applicable to (where [.] and {.} represents the greatest integer functions and fractional part functions, respectively). f (b) g (c) k (d) h

Let f(x)=sqrtx and g(x)=x be two functions defined over the set of non-negative real numbers. Find (f+g) (x), (f-g), (fg) (x) and (f/g) (x) .

Let f(x)=a x^2+b x+a ,b ,c in Rdot If f(x) takes real values for real values of x and non-real values for non-real values of x , then a=0 b. b=0 c. c=0 d. nothing can be said about a ,b ,cdot

Find c of Lagranges mean value theorem for the function f(x)=3x^2+5x+7 in the interval [1,3]dot

If f:R^+→R^+ and g:R^+→R^+ , defined as f(x)=x^2,g(x)= sqrtx ​, then find gof and fog whether are they equivalent?

Let f^(prime)(x)=e^x^2 and f(0)=10. If A

Explain why Lagrange's mean value theorem is not applicable to the following functions in the respective intervals : f(x)=(x+1)/x,x in[-1,2]

Explain why Lagrange's mean value theorem is not applicable to the following functions in the respective intervals: f(x) = (x +1)/(x), x in [-1,2]