If from Lagrange's Mean Value theorem we have,
`f(4)-f(1)=(4-1)f'(c )` then -

If from Lagrange's Mean value theorem we have, f(4) - f(1) = (4 -1) then find the range of c

State Lagrange's mean value theorem.

Lagrange's mean value theorem is , f(b)-f(a)=(b-a)f'(c ), a lt c lt b if f(x)=sqrt(x) and a=4, b=9, find c.

Lagrange's mean value theorem is , f(b)-f(a)=(b-a)f'(c ), a lt c lt b if f(x)=Ax^(2)+Bx+c" in " a le x le b , find c.

Using Largrange's mean value theorem f(b)-f(a)=(b-a)f'(c ) find the value of c, given f(x)=x(x-1)(x-2), a=0 and b=(1)/(2) .

In the following Lagrange's mean value theorem, f(a+h)-f(a)=hf'(a+theta h), 0 lt theta lt 1 If f(x)=(1)/(3) x^(3)-(3)/(2) x^(2)+2x, a=0 and h=3 " find " theta .

Verify Lagrange's Mean Value Theorem for the function f(x)=4(6-x)^(2)" in "5 le x le 7

Using Lagrange's mean value theorem prove that, e^(x) gt 1 +x

Using Lagrange's mean value theorem prove that, log (1+x) lt x ("when " x gt 0)

Examine the applicability of lagrange's Mean value theorem for the function f(x) = x^2 + 2 in the interval [2,4]