Question

Consider the functions defined implicitly by the equation $y^3-3y+x=0$ on various intervals in the real line. If $x\in (-\infty ,-2)\cup (2,\infty )$, the equation implicitly defines a unique real valued differentiable function $y=f(x)$. If $x\in (-2,2)$, the equation implicitly defines a unique real valued differentiable function $y=g(x)$ satisfying $g(0)=0$
$\underset{-1}{\overset{1}{\int }}{g}^{\prime }(x)dx=$

• A. $2g(-1)$
• B. 0
• C. $-2g(1)$
• D. $2g(1)$

Answer 1

Answer: (D)

We have $y^{\prime }=\frac{1}{3\left(1-\left(f(x{)}^2\right)\right)}$ which is even
Hence $\underset{-1}{\overset{1}{\int }}{g}^{\prime }(x)=g(1)-g(-1)=2g(1)$