If a car's $x$-position at time $t=0$ is $x(0)=0$ and it has an $x$-velocity of $v_{x}(t)=b(t-T)^{2}$, where $b$ and $T$ are constants, which function below best describes $x(t)$ ?
A) $x(t)=2 b(t-T)$
B) $x(t)=3 b(t-T)^{3}$
C) $x(t)=\frac{1}{3} b(t-T)^{3}$
D) $x(t)=\frac{1}{2} b(t-T)$
E)$x(t)=\frac{1}{3} b\left[(t-T)^{3}+T^{3}\right]$
F) Other (specify)

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The Answer of If a car's $x$-position at time $t=0$ is $x(0)=0$ and it has an $x$-velocity of $v_{x}(t)=b(t-T)^{2}$, where $b$ and $T$ are constants, which function below best describes $x(t)$ ?
A) $x(t)=2 b(t-T)$
B) $x(t)=3 b(t-T)^{3}$
C) $x(t)=\frac{1}{3} b(t-T)^{3}$
D) $x(t)=\frac{1}{2} b(t-T)$
E)$x(t)=\frac{1}{3} b\left[(t-T)^{3}+T^{3}\right]$
F) Other (specify)

If a Car's xxx -Position at Time t=0t=0t=0 Is x(0)=0x(0)=0x(0)=0 And It Has An

If a Car's $x$ -Position at Time $t=0$ Is $x(0)=0$ And It Has An