2.5 is what percent of 5?

Multiply 125.5 miles by 1.61 to get total kilometers:

125.5 x 1.61 = 202.055 kilometers total.

Divide 150 minutes by 60 to get total hours:

150/ 60 = 2.5 hours.

Now Divide total kilometers by total hours to get kilometers per hour:

202.055 kilometers / 2.5 hours = 80.822 kilometers per hour.

Round the answer as needed.

Answer:

80.822 km/hour

Step-by-step explanation:

A train travels in 150 minutes = 125.5 miles.

First we will convert 125.5 miles to kilometers

1 mile = 1.61 kilometers

125.5 miles = 125.5 × 1.61

                   = 202.055 kilometers

1 hour = 60 minutes

150 minutes =

                    = 2.5 hours

Hence the train travels 202.055 kilometers in 2.5 hours.

Therefore, The speed of the train in one hour =

                                                                           = 80.822 km/hour

The trains speed is 80.822 km/hour.

Stacey sent 470 text messages in the month of February.

Let's assume that Stacey sent x text messages in February. We know that her plan charges 20¢ for each message over 450, in addition to a $14 base charge. To find the total cost for her text messages in February, we can set up the following equation:

Total cost = Base charge + (Additional messages * Charge per message)

The base charge is $14, and the number of additional messages beyond 450 is (x - 450) since 450 messages are already covered in the base charge. The charge per message is 20¢, which is equivalent to 0.20 dollars. So, the equation becomes:

$18.00 = $14.00 + (0.20 * (x - 450))

Now, let's solve for x:

$18.00 - $14.00 = 0.20 * (x - 450)

$4.00 = 0.20x - 90

$4.00 + $90 = 0.20x

$94.00 = 0.20x

Now, to find the value of x (the total number of text messages), we divide both sides by 0.20:

x = $94.00 / 0.20

x = 470

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$18 = 14 + 0.20(t)

- 14

4 =  0.20t

Divide 4 by 0.20

t = 20

0.20 * 20 = 4

4 + 14 = 18

Because it only charged her for texts after 450, its 450 + 20.

470. She sent 470 texts that month.

Final answer:

To solve the problem, we set up a linear equation as $260 = $200 + $12x. After rearranging and solving the equation, we find that Miguel would need 5 cans of paint for a job worth $260.

Explanation:

The question pertains to solving a linear equation derived from a real-life scenario. In the given problem, Miguel has a set fee of $200 and then charges $12 per can of paint. If he has a job worth $260, to find how many cans of paint (represented by x) he'd need, we'll use the formula: total cost = set fee + (cost per can * no. of cans).

So, the equation in our case becomes: $260 = $200 + $12x.

To solve this equation, perform the following steps:

1. Subtract $200 from both sides to get $60 = $12x.
2. Next, divide both sides by $12, so x = $60 / $12.
3. After performing the division, you'll find that x = 5.

So, Miguel would need 5 cans of paint for a job worth $260.

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