The u-drive rent-a-truck company plans to spend $10 million on 260 new vehicles. each commercial van will cost $25 comma 000 , each small truck $50 comma 000 , and each large truck $50 comma 000. past experience shows that they need twice as many vans as small trucks. how many of each type of vehicle can they buy?

Question

Business

Tori Weiss

11 August, 14:30

The u-drive rent-a-truck company plans to spend $10 million on 260 new vehicles. each commercial van will cost $25 comma 000 , each small truck $50 comma 000 , and each large truck $50 comma 000. past experience shows that they need twice as many vans as small trucks. how many of each type of vehicle can they buy?

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Answers (2)

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Kolton Hall · Answer 1

Answer: 120 commercial vans, 60 small trucks, and 80 large trucks

Explanation: First, we will define the variables that we need to solve the problem. In this case the question is, how many of each type of vehicle, so let

V = number of vans

S = number of small trucks

L = number of large trucks

Next, we will translate the words in the problem into mathematical statements that we can use to solve the problem, thus:

"twice as many vans as small trucks" means that:

V = 2*S

"260 new vehicles" means that:

V + S + L = 260

The last part is the cost equation which is a little more complicated:

25000*V + 50000*S + 50000*L = 10,000,000

Divide both sides of this equation by 1000, we have:

25*V + 50*S + 50*L = 10000

We start with the simplest one:

V = 2*S.

This means that wherever we see a V in the other 2 equations we can replace it with 2*S, which will leave us with 2 equations in 2 unknowns

(2*S) + S + L = 260 = => 3*S + L = 260

25 * (2*S) + 50*S + 50*L = 10000

==> 100*S + 50*L = 10000

Now we can solve the top equation for L to get L = 260 - 3*S

and substitute this value for L into the bottom equation

100*S + 50 * (260 - 3*S) = 10000

100*S + 13000 - 150*S = 10000

-50*S = - 3000

S = 60

Once we have one of the answers then plug in back in to previous equations to find the others

L = 260 - 3*S = 260 - 3 * (60)

= 260 - 180 = 80

V = 2*S = 2 * (60) = 120

So they can buy 120 commercial vans, 60 small trucks, and 80 large trucks

Lyons · Answer 2

Answer: They would buy 130 vans, 65 small trucks and 65 large trucks

Explanation: Budget has been given as $10,000 and the company needs up to 260 vehicles, commercial vans ($25000), small trucks ($50000) and large trucks ($50000). They need twice as many vans as small trucks which means for every small truck purchased, they would purchase two commercial vans, or ratio 2:1 for the ratio of commercial vans to small trucks. The cost of the small truck is the same as the cost of the large truck. Therefore the ratio would be 2:1:1, for the ratio of commercial vans to small trucks to large trucks.

The number of commercial vans to be purchased therefore is derived as

2/4 = x/260

(2 x 260) / 4 = x

520/4 = x

130 = x

The number of vans to be purchased is 130 and this is twice the number of small trucks which means small trucks purchased would be 130 divided by 2 which equals 65, and large trucks also would be 65 making a total of 260 vehicles.