TS EAMCET 11-Sep-2020 Shift 1 Solved Paper

Let a polynomial function
Now, as f(x) is a polynomial so it is continuous and differentiable in R. and as f(0)=0 and
So, according to Rolle's theorem
f′(x)=0 for at least one value of x∈(0,1).
Therefore, Statement (I) is true.
It is given that [f:a,b]→R is continuous on [a,b] and differentiable in (a,b), where a>0 and
‌

f(a)

a

=‌

f(b)

b

⇒f(b)=‌

b

a

f(a)
Now, according to By Lagrange's mean value theorem (L.M.V.T), we have
∴f′(c)=‌

f(c)

c

⇒cf′(c)=f(c)