Two cars, A and B, start from rest at O and begin to travel in the same direction. The speeds of the cars are given by $v_A = t^2$ and $v_B = 6t - 0.5t^2$, where $v_A$ and $v_B$ are measured in m s$^{-1}$ and $t$ is the time in seconds measured from the instant when the cars started moving. (i) Find the speed of each car after 4 seconds. (ii) Find the distance between the cars after 4 seconds. (iii) On the same speed-time graph, sketch the speed of A and the speed of B for the first 4 seconds and shade in the area that represents the distance between the cars after 4 seconds. a) A company uses a cost function $C(x)$ to estimate the cost of producing x items. The cost function is given by the equation $C(x) = F + V(x)$ where F is the estimate of all fixed costs and $V(x)$ is the estimate of the variable costs (energy, materials, etc.) of producing x items. $$\frac{dC}{dx} = M(x)$$ is the marginal cost, the cost of producing one more item. A certain company has a marginal cost function given by $M(x) = 74 + 1.1x + 0.03x^2$. (i) Find the cost function, $C(x)$. (ii) Find the increase in cost if the company decides to produce 160 items instead of 120. (iii) If $C(10) = 3500$, find the fixed costs.

Photo AI

Two cars, A and B, start from rest at O and begin to travel in the same direction - Leaving Cert Applied Maths - Question 10 - 2015

Question 10

Two cars, A and B, start from rest at O and begin to travel in the same direction. The speeds of the cars are given by $v_A = t^2$ and $v_B = 6t - 0.5t^2$, where $v... show full transcript

Worked Solution & Example Answer:Two cars, A and B, start from rest at O and begin to travel in the same direction - Leaving Cert Applied Maths - Question 10 - 2015

Step 1

Find the speed of each car after 4 seconds.

96%

114 rated

Answer

To find the speed of each car after 4 seconds, we can substitute $t = 4$ into the equations for $v_A$ and $v_B$ :

For car A:

$v_A = t^2 = 4^2 = 16 \, \text{m s}^{-1}$
For car B:

$v_B = 6t - 0.5t^2 = 6(4) - 0.5(4^2) = 24 - 8 = 16 \, \text{m s}^{-1}$

Thus, the speed of both cars after 4 seconds is 16 m s $^{-1}$ .

Step 2

Find the distance between the cars after 4 seconds.

99%

104 rated

Answer

To find the distance traveled by each car after 4 seconds, we need to integrate their speed functions from 0 to 4 seconds:

For car A:

$S_A = \int_{0}^{4} t^2 \, dt = \left[ \frac{t^3}{3} \right]_{0}^{4} = \frac{4^3}{3} = \frac{64}{3} \, \text{m}$
For car B:

$S_B = \int_{0}^{4} (6t - 0.5t^2) \, dt = \left[ 3t^2 - \frac{t^3}{6} \right]_{0}^{4} = 3(4^2) - \frac{(4^3)}{6} = 48 - \frac{64}{6} = \frac{112}{3} \, \text{m}$

The distance between the cars is given by:

$S_B - S_A = \frac{112}{3} - \frac{64}{3} = \frac{48}{3} = 16 \, \text{m}$

Step 3

On the same speed-time graph, sketch the speed of A and the speed of B for the first 4 seconds and shade in the area that represents the distance between the cars after 4 seconds.

96%

101 rated

Answer

To create the sketch, draw a graph with time on the x-axis (0 to 4 seconds) and speed on the y-axis.

Plot the speed of car A as a curve representing $v_A = t^2$ .
Plot the speed of car B as a curve representing $v_B = 6t - 0.5t^2$ .
Shade the area between the two curves up to 4 seconds, identifying this area as the distance between the cars after 4 seconds.
This representation visually demonstrates the speeds of both cars and the distance between them.

Step 4

Find the cost function, C(x).

98%

120 rated

Answer

To find the cost function, we integrate the marginal cost function $M(x)$ :

Starting from the marginal cost $M(x) = 74 + 1.1x + 0.03x^2$ , we integrate:

$C(x) = \int M(x) \, dx = \int (74 + 1.1x + 0.03x^2) \, dx$

This gives us:

$C(x) = 74x + 0.55x^2 + 0.01x^3 + F$

where F is the constant of integration.

Step 5

Find the increase in cost if the company decides to produce 160 items instead of 120.

97%

117 rated

Answer

To find the increase in cost, we evaluate $C(160)$ and $C(120)$ :

Calculate $C(160)$ :

$C(160) = 74(160) + 0.55(160)^2 + 0.01(160)^3 + F$

$C(160) = 11840 + 1408 + 256 + F = 13404 + F$
Calculate $C(120)$ :

$C(120) = 74(120) + 0.55(120)^2 + 0.01(120)^3 + F$

$C(120) = 8880 + 790 + 144 + F = 9814 + F$
The increase in cost is given by:

$C(160) - C(120) = (13404 + F) - (9814 + F) = 13404 - 9814 = 3588$

Step 6

If C(10) = 3500, find the fixed costs.

97%

121 rated

Answer

Given that $C(10) = 3500$ , we substitute back into the cost function:

First, calculate $C(10)$ :

$C(10) = 74(10) + 0.55(10)^2 + 0.01(10)^3 + F$

$C(10) = 740 + 55 + 1 + F = 796 + F$
Setting this equal to 3500:

$796 + F = 3500$
Solving for F:

$F = 3500 - 796 = 2704$

Thus, the fixed costs are F = 2704.

Two cars, A and B, start from rest at O and begin to travel in the same direction - Leaving Cert Applied Maths - Question 10 - 2015

Worked Solution & Example Answer:Two cars, A and B, start from rest at O and begin to travel in the same direction - Leaving Cert Applied Maths - Question 10 - 2015

Find the speed of each car after 4 seconds.

Find the distance between the cars after 4 seconds.

On the same speed-time graph, sketch the speed of A and the speed of B for the first 4 seconds and shade in the area that represents the distance between the cars after 4 seconds.

Find the cost function, C(x).

Find the increase in cost if the company decides to produce 160 items instead of 120.

If C(10) = 3500, find the fixed costs.

Join the Leaving Cert students using SimpleStudy...