w=δe = e_f - e_i
= ½mv_f² - ½mvi² = ½m(v_f² - v_i²)
- a catamaran with a mass of 5.44×103 kg is moving at 12 knots. how much work is required to increase the speed to 16 knots? (one knot = 0.51 m/s.)
- an 875.0-kg car speeds up from 22.0 m/s to 44.0 m/s. what are the initial and final kinetic energies of the car? how much work is done on the car to increase its speed?

Question

Accepted Answer

### First Problem (Catamaran)
#### Explanation:
We use the work - kinetic energy theorem $W=\Delta E_{k}=\frac{1}{2}m(v_{f}^{2}-v_{i}^{2})$. First, we need to convert the speed from knots to m/s. Given that 1 knot = 0.51 m/s.
### Step 1: Convert speeds to m/s
- Initial speed $v_{i}=12$ knots. So $v_{i}=12\times0.51\ m/s = 6.12\ m/s$
- Final speed $v_{f}=16$ knots. So $v_{f}=16\times0.51\ m/s=8.16\ m/s$
- Mass of the catamaran $m = 5.44\times10^{3}\ kg$
### Step 2: Calculate the work done
Using the formula $W=\frac{1}{2}m(v_{f}^{2}-v_{i}^{2})$
$$
\begin{align*}
W&=\frac{1}{2}\times5.44\times 10^{3}\times(8.16^{2}-6.12^{2})\
&=\frac{1}{2}\times5.44\times 10^{3}\times(66.5856 - 37.4544)\
&=\frac{1}{2}\times5.44\times 10^{3}\times29.1312\
&=2.72\times 10^{3}\times29.1312\
&=79236.864\ J\approx7.92\times 10^{4}\ J
\end{align*}
$$

### Second Problem (Car)
#### Part 1: Initial Kinetic Energy ($E_{ki}$)
#### Explanation:
The formula for kinetic energy is $E_{k}=\frac{1}{2}mv^{2}$
### Step 1: Calculate initial kinetic energy
Given $m = 875.0\ kg$ and $v_{i}=22.0\ m/s$
$$
\begin{align*}
E_{ki}&=\frac{1}{2}\times875.0\times(22.0)^{2}\
&=\frac{1}{2}\times875.0\times484\
& = 875.0\times242\
&=211750\ J = 2.12\times 10^{5}\ J
\end{align*}
$$

#### Part 2: Final Kinetic Energy ($E_{kf}$)
#### Explanation:
Using the kinetic energy formula $E_{k}=\frac{1}{2}mv^{2}$
### Step 1: Calculate final kinetic energy
Given $m = 875.0\ kg$ and $v_{f}=44.0\ m/s$
$$
\begin{align*}
E_{kf}&=\frac{1}{2}\times875.0\times(44.0)^{2}\
&=\frac{1}{2}\times875.0\times1936\
&=875.0\times968\
& = 847000\ J=8.47\times 10^{5}\ J
\end{align*}
$$

#### Part 3: Work done to increase speed
#### Explanation:
Using the work - kinetic energy theorem $W=\Delta E_{k}=E_{kf}-E_{ki}$
### Step 1: Calculate the work done
$$
\begin{align*}
W&=E_{kf}-E_{ki}\
&=847000 - 211750\
&=635250\ J = 6.35\times 10^{5}\ J
\end{align*}
$$
Or we can also use $W=\frac{1}{2}m(v_{f}^{2}-v_{i}^{2})$
$$
\begin{align*}
W&=\frac{1}{2}\times875.0\times(44.0^{2}-22.0^{2})\
&=\frac{1}{2}\times875.0\times(1936 - 484)\
&=\frac{1}{2}\times875.0\times1452\
&=875.0\times726\
&=635250\ J=6.35\times 10^{5}\ J
\end{align*}
$$

### Answers:
- Work required for catamaran: $\boldsymbol{\approx7.92\times 10^{4}\ J}$
- Initial kinetic energy of car: $\boldsymbol{2.12\times 10^{5}\ J}$
- Final kinetic energy of car: $\boldsymbol{8.47\times 10^{5}\ J}$
- Work done on car: $\boldsymbol{6.35\times 10^{5}\ J}$

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QUESTION IMAGE

Question

Explanation:

First Problem (Catamaran)

Step 1: Convert speeds to m/s

Step 2: Calculate the work done

Second Problem (Car)

Part 1: Initial Kinetic Energy (\(E_{ki}\))

Step 1: Calculate initial kinetic energy

Part 2: Final Kinetic Energy (\(E_{kf}\))

Step 1: Calculate final kinetic energy

Part 3: Work done to increase speed

Answer: