Which situation is best represented by the following equation?
20h+40=480
(1 point)
Responses
Stacey was paid $40 last week. She was paid a $20 bonus and $480 for each hour she worked.
Stacey was paid $40 last week. She was paid a $20 bonus and $480 for each hour she worked.
Stacey was paid $480 last week. She was paid a $40 bonus and $20 for each hour she worked.
Stacey was paid $480 last week. She was paid a $40 bonus and $20 for each hour she worked.
Stacey was paid $480 last week. She was paid a $20 bonus and $40 for each hour she worked.
Stacey was paid $480 last week. She was paid a $20 bonus and $40 for each hour she worked.
Stacey was paid $40 last week. She was paid a $480 bonus and $20 for each hour she worked.
Stacey was paid $40 last week. She was paid a $480 bonus and $20 for each hour she worked.
Stacey was paid $480 last week. She was paid a $20 bonus and $40 for each hour she worked.
The situation best represented by the equation 20h + 40 = 480 is: Stacey was paid $20 for each hour she worked, and she also received a $40 bonus.
To determine which situation is best represented by the given equation, we need to interpret the equation and its components.
The equation is:
20h + 40 = 480
The variable h represents the number of hours worked, and the equation represents the relationship between the number of hours worked and the total pay earned.
Now, we can solve the equation to determine the value of h.
First, we subtract 40 from both sides of the equation:
20h = 480 - 40
20h = 440
Next, we divide both sides of the equation by 20 to isolate h:
h = 440 / 20
h = 22
So, the value of h is 22, which means Stacey worked 22 hours.
Now, let's analyze the answer choices:
1) Stacey was paid $40 last week. She was paid a $20 bonus and $480 for each hour she worked.
This choice does not match the given equation since it mentions a $480 payment for each hour worked, whereas the equation shows a flat rate of $20 per hour.
2) Stacey was paid $480 last week. She was paid a $40 bonus and $20 for each hour she worked.
This choice matches the given equation. Stacey worked 22 hours, and she received a $40 bonus plus $20 for each hour worked.
3) Stacey was paid $480 last week. She was paid a $20 bonus and $40 for each hour she worked.
This choice does not match the given equation since it mentions a $40 payment for each hour worked, whereas the equation shows a flat rate of $20 per hour.
4) Stacey was paid $40 last week. She was paid a $480 bonus and $20 for each hour she worked.
This choice does not match the given equation. The equation shows a payment of $480 in total, not as a bonus.
Therefore, the correct answer is:
Stacey was paid $480 last week. She was paid a $40 bonus and $20 for each hour she worked.
Which situation is best represented by the following equation?
2000−200x=1000
(1 point)
Responses
Jenny went on vacation. She started with $2000 and spent $200 each day. Solve for x to find the number of days Jenny has been on vacation if she has $1000 left to spend.
Jenny went on vacation. She started with $2000 and spent $200 each day. Solve for x to find the number of days Jenny has been on vacation if she has $1000 left to spend.
Jenny went on vacation. She started with $2000 and spent $200 each day. Solve for x to find out how much money Jenny has left to spend.
Jenny went on vacation. She started with $2000 and spent $200 each day. Solve for x to find out how much money Jenny has left to spend.
Jenny went on vacation. She spent $200 each day. Solve for x to find the number of days Jenny has been on vacation if she has $1000 left to spend.
Jenny went on vacation. She spent $200 each day. Solve for x to find the number of days Jenny has been on vacation if she has $1000 left to spend.
Jenny went on vacation. She started with $1000 and spent $250 each day. Solve for x to find the number of days Jenny has been on vacation if she has $2000 left to spend.
The situation best represented by the equation 2000-200x=1000 is:
Jenny went on vacation. She started with $2000 and spent $200 each day. Solve for x to find the number of days Jenny has been on vacation if she has $1000 left to spend.
Jillian spent $31 to park for 6 hours. The parking garage charges a base rate of $3 for the first two 2 hours, and then an hourly rate for each additional hour. How much does each additional hour of parking cost?(1 point)
Responses
$8.50
$8.50
$5.17
$5.17
$4.67
$4.67
$7.00
To determine the cost of each additional hour of parking, we need to subtract the cost of the base rate from the total cost and divide the result by the number of additional hours.
The total cost of parking for 6 hours is $31.
The base rate for the first 2 hours is $3.
The cost of the additional 4 hours is $31 - $3 = $28.
To find the cost for each additional hour, we divide $28 by the number of additional hours, which is 4.
$28 / 4 = $7
Therefore, the cost of each additional hour of parking is $7.
Daisy has 6 more than three times as many seashells as Lucy. Daisy has 36 seashells. How many does Lucy have?(1 point)
Responses
14
14
90
90
10
10
126
To find out how many seashells Lucy has, we need to consider that Daisy has 6 more than three times as many seashells as Lucy.
Let's represent the number of seashells Lucy has by L.
According to the given information, Daisy has 6 more than three times Lucy's number of seashells, so we can write this equation:
3L + 6 = 36
Now, we need to solve this equation to find the value of L.
Subtract 6 from both sides:
3L = 36 - 6
3L = 30
Divide both sides by 3:
L = 30 / 3
L = 10
Therefore, Lucy has 10 seashells.
Solve for c.
2/5c+5=95
(1 point)
Responses
225
225
36
36
250
250
40