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iGCSE (2021 Edition)

11.21 Kinematics

Interactive practice questions

The position (in metres) of an object along a straight line after $t$t seconds is modelled by $x\left(t\right)=6t^2$x(t)=6t2.

a

State the velocity $v\left(t\right)$v(t) of the particle at time $t$t.

b

Which of the following represent the velocity of the particle after $4$4 seconds? Select all that apply.

$x'\left(4\right)$x(4)

A

$v'\left(4\right)$v(4)

B

$x\left(4\right)$x(4)

C

$v\left(4\right)$v(4)

D
c

Hence find the velocity of the particle after $4$4 seconds.

Easy
1min

A car starts at rest and has a displacement of $s$s metres in $t$t seconds, where $s=\frac{1}{6}t^3+\frac{1}{4}t^2$s=16t3+14t2.

Easy
2min

A boy throws a ball vertically. The height of the ball $h$h in metres is given by $h=1+17t-5t^2$h=1+17t5t2 where $t$t is given in seconds.

Easy
2min

The position (in metres) of an object along a straight line after $t$t seconds is modelled by $x\left(t\right)=18\sqrt{t}$x(t)=18t.

Easy
2min
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Outcomes

0606C14.11

Apply differentiation and integration to kinematics problems that involve displacement, velocity and acceleration of a particle moving in a straight line with variable or constant acceleration, and the use of x–t and v–t graphs.

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