Level:
Project ID:
2010005101
Source Problem:
Accepted:
0
Clonable:
1
Easy:
0
Evaluate the following integral on \( \mathbb{R} \).
\[ \int\left(2^3+2x^3+\mathrm{e}^x-2^x-2^{\mathrm{e}}\right)\mathrm{d}x \]
\( 8x-0.5x^4+\mathrm{e}^x-\frac{2^x}{\ln2} -2^{\mathrm{e}} x+c,\ c\in\mathbb{R} \)
\( -0.5x^4+\mathrm{e}^x-\frac{2^x}{\ln2} +c,\ c\in\mathbb{R} \)
\( 8x-2x^4+\mathrm{e}^x-2^x-\frac{2^{\mathrm{e}+1}}{\mathrm{e}+1}+c,\ c\in\mathbb{R} \)
\( 4-6x^4+\mathrm{e}^x -\frac{2^x}{\ln2} -2^\mathrm{e} x+c,\ c\in\mathbb{R} \)