Calculating charge when current is a piecewise function

Question

The current is defined as follows:\$\$

\$ i=\begin{cases} 4 & 0<t<1 \\ 4t^2 & t > 1 \\ \end{cases} \$

The goal is to calculate the charge from \$t=0\$ to \$t=2\$ s

What I've tried:
I've tried integrating both parts.

\$\int 4dt=4t+c\$
\$\int 4t^2dt=\frac{4}{3}t^3+c\$

Then I fill in \$2\$ in the second integrated equation and \$0\$ in the first equation, and I subtract. I get \$\frac{32}{3}\$ coulombs as the answer, but I should get \$\frac{40}{3}\$ coulombs.

Where did I go wrong?

Answer 1

You goofed the integration.

\$ \int_0^1 4dt + \int_1^2 4t^2dt \\ = \rvert_0^1 4t + \rvert_1^2{4\over3}t^3\\ = 4(1) - 4(0) + {4\over3}(2)^3 - {4\over3}(1)^3\\ = 4 + {28\over3}\\ = {40\over3}\$

Answer 2

From 0 to 1: 12/3 C

From 1 to 2: 4/3*(8-1) = 28/3 C

12/3 C + 28/3 C= 40/3 C