If f(x) = xex(1-x), x ∈ R , then f(x) is

Question

If f(x) = xex(1-x), x ∈ R , then f(x) is (A) decreasing on [-1/2,1] (B) decreasing on R (C) increasing on [-1 /2,1 ] (D) increasing on R

Tardigrade Admin · Accepted Answer

f(x) = xex(1-x), x ∈ R f'(x) = ex(1-x). [1+x-2x2] = -ex(1-x)[2x2-x-1] = -2xx(1-x)[(x+(1/2))(x-1)] f'(x) = -2ex(1-x).A where A = (x+(1/2))(x-1) Now, exponential function is always +ve and f'(x) will be opposite to the sign of A which is -ve in [-(1/2), 1] Hence, f'(x) is +ve in [-(1/2),1] ∴ f(x) is increasing on [-(1/2),1]

Q. If $f (x) = x e^{x (1 - x)}, x \in R$ , then $f (x)$ is

decreasing on $[- 1/2, 1]$

decreasing on $R$

increasing on $[- 1/2, 1]$

increasing on $R$

Q. If f(x)=xex(1−x),x∈R , then f(x) is

decreasing on [−1/2,1]

decreasing on R

increasing on [−1/2,1]

increasing on R

Q. If $f (x) = x e^{x (1 - x)}, x \in R$ , then $f (x)$ is

decreasing on $[- 1/2, 1]$

decreasing on $R$

increasing on $[- 1/2, 1]$

increasing on $R$