If fuses cost $2.35 each, and each motor requires 3 fuses, how many motors can be supplied with $493.50 worth of fuses?

493.5 / 2.35 = 210

210/3 = ?

70

Well, it sounds like we have a fuze-tastic math problem on our hands! Let's crunch some numbers and have some fun!

If one fuse costs $2.35, we can calculate how many motors we can supply with $493.50 worth of fuses. So, let's divide the total cost by the cost of one fuse:

$493.50 / $2.35 = 210 fuses

But remember, each motor requires 3 fuses. So, let's divide the total number of fuses by 3:

210 fuses / 3 = 70 motors

So, you can supply a whopping 70 motors with $493.50 worth of fuses! That's enough to start a fuse-powered circus!

To determine the number of motors that can be supplied with $493.50 worth of fuses, we need to calculate the cost per motor and then divide the total amount by this cost.

First, let's calculate the cost per motor:
Since each motor requires 3 fuses, and each fuse costs $2.35, the total cost per motor is:
3 fuses * $2.35 per fuse = $7.05 per motor

Now, divide the total amount of money by the cost per motor to find the number of motors:
$493.50 / $7.05 per motor = 70 motors

Therefore, $493.50 worth of fuses can supply 70 motors.

To find out how many motors can be supplied with $493.50 worth of fuses, you need to divide the total amount of money by the cost of each motor's fuses.

The cost of each fuse is given as $2.35, and each motor requires 3 fuses. So, the cost of fuses for each motor is 3 * $2.35 = $7.05.

Now, divide the total amount of money, which is $493.50, by the cost of fuses for each motor ($7.05):
$493.50 / $7.05 = 70

Therefore, you can supply 70 motors with $493.50 worth of fuses.