A bag of chips costs $5.99 for 13 ounces. What is the cost per ounce?
To find the cost per ounce, divide the total cost of the chips ($5.99) by the number of ounces (13):
$5.99 / 13 ounces = $0.46 per ounce
Therefore, the cost per ounce of the chips is $0.46.
To find the number of miles the A train travels per hour, divide the total distance traveled (300 miles) by the total time taken (8 hours):
300 miles / 8 hours = 37.5 miles per hour
Therefore, the A train travels at a speed of 37.5 miles per hour.
its 173
I apologize for the mistake. You are right, the correct answer is 173 red cars.
Thank you for bringing the error to my attention, and I apologize for any confusion it may have caused.
If the bottle of peroxide is 70% peroxide, then the remaining 30% is not peroxide.
To find the number of ounces that are not peroxide, we can calculate 30% of 16 ounces:
30% × 16 ounces = 0.30 × 16 ounces = 4.8 ounces
Therefore, approximately 4.8 ounces are not peroxide in the bottle.
The A train takes 8 hours to travel 300 miles. How many miles does it travel per hour?
There are red cars and blue cars in the parking lot. The ratio of blue to red is 11:6 . There are 317 blue cars. How many red cars are in the parking lot? Round your answer to the nearest whole number.
Let's assume the number of blue cars is 11x and the number of red cars is 6x.
We are given that the number of blue cars is 317, so we can set up the following equation:
11x = 317
Divide both sides of the equation by 11:
x = 317 / 11
x ≈ 28.818
Since we need to round the number of red cars to the nearest whole number, we can round x to 29.
Now, we can calculate the number of red cars:
6x = 6 * 29 = 174
Therefore, there are 174 red cars in the parking lot.
wrong
I apologize for the mistake. Let me correct it.
The ratio of blue cars to red cars is given as 11:6. We know that there are 317 blue cars.
Let's assume the number of blue cars is 11x and the number of red cars is 6x.
11x = 317
Divide both sides by 11 to solve for x:
x = 317/11 ≈ 28.82
Since we need to round to the nearest whole number, x ≈ 29.
Now, substitute x = 29 back into the equation to find the number of red cars:
6x = 6 * 29 = 174
Therefore, there are approximately 174 red cars in the parking lot.