To determine how much each person owes, we need to calculate the total cost of the food and then divide it by the number of friends (assuming there are 5 friends).
The cost of two large cheese pizzas is $10 each, so the total cost of the pizzas is 2 * $10 = $20.
The cost of wings is $18.99.
The cost of breadsticks is $5.59.
Therefore, the total cost of the food is $20 + $18.99 + $5.59 = $44.58.
To split this cost evenly among 5 friends, we divide the total cost by 5: $44.58 / 5 = $8.916.
Rounding to the nearest hundredth, each person owes $8.92.
Therefore, the correct answer is $8.92.
Five friends order food and want to split the bill. They order two large cheese pizzas for $10 each, wings for $18.99, and breadsticks for $5.59.
Determine how much each person owes. (Round to the nearest hundredth)
(1 point)
Responses
$6.92
$6.92
$8.92
$8.92
$34.58
$34.58
$44.58
11 answers
Five people ate pretzels. A serving of pretzels weighs 0.9 ounces. Which of the following people ate more than 1.2 ounces of pretzels? Select all that apply.(2 points)
Responses
Kate ate 1.9 servings of pretzels.
Kate ate 1.9 servings of pretzels.
Paul ate 1.3 servings of pretzels.
Paul ate 1.3 servings of pretzels.
Ian ate 1 serving of pretzels.
Ian ate 1 serving of pretzels.
Aidan are 0.7 servings of pretzel.
Aidan are 0.7 servings of pretzel.
Ava ate 1.4 servings of pretzels.
Responses
Kate ate 1.9 servings of pretzels.
Kate ate 1.9 servings of pretzels.
Paul ate 1.3 servings of pretzels.
Paul ate 1.3 servings of pretzels.
Ian ate 1 serving of pretzels.
Ian ate 1 serving of pretzels.
Aidan are 0.7 servings of pretzel.
Aidan are 0.7 servings of pretzel.
Ava ate 1.4 servings of pretzels.
To determine who ate more than 1.2 ounces of pretzels, we need to multiply the number of servings each person ate by the weight of each serving (0.9 ounces). Anyone whose total weight is greater than 1.2 ounces ate more than that amount.
Let's calculate the total weight for each person:
Kate: 1.9 servings * 0.9 ounces/serving = 1.71 ounces
Paul: 1.3 servings * 0.9 ounces/serving = 1.17 ounces
Ian: 1 serving * 0.9 ounces/serving = 0.9 ounces
Aidan: 0.7 servings * 0.9 ounces/serving = 0.63 ounces
Ava: 1.4 servings * 0.9 ounces/serving = 1.26 ounces
From the calculations above, Kate and Ava both ate more than 1.2 ounces of pretzels. So the correct answers are:
- Kate
- Ava
Let's calculate the total weight for each person:
Kate: 1.9 servings * 0.9 ounces/serving = 1.71 ounces
Paul: 1.3 servings * 0.9 ounces/serving = 1.17 ounces
Ian: 1 serving * 0.9 ounces/serving = 0.9 ounces
Aidan: 0.7 servings * 0.9 ounces/serving = 0.63 ounces
Ava: 1.4 servings * 0.9 ounces/serving = 1.26 ounces
From the calculations above, Kate and Ava both ate more than 1.2 ounces of pretzels. So the correct answers are:
- Kate
- Ava
Simplify the expression using the quotient rule of exponents.
5653
(1 point)
Responses
51
5 to the 1th power
518
5 to the 18th power
53
5 cubed
59
5653
(1 point)
Responses
51
5 to the 1th power
518
5 to the 18th power
53
5 cubed
59
To simplify the expression using the quotient rule of exponents, we need to subtract the exponents when dividing the same base.
The expression given is 5653, which can be written as (5^6) / (5^3).
Using the quotient rule of exponents, we subtract the exponents:
5^6 / 5^3 = 5^(6 - 3) = 5^3.
Therefore, the simplified expression is 5^3, which is equal to 125.
The correct answer is: 5 cubed.
The expression given is 5653, which can be written as (5^6) / (5^3).
Using the quotient rule of exponents, we subtract the exponents:
5^6 / 5^3 = 5^(6 - 3) = 5^3.
Therefore, the simplified expression is 5^3, which is equal to 125.
The correct answer is: 5 cubed.
no there is 51
5 to the 1th power
518
5 to the 18th power
53
5 cubed
59
5 to the 1th power
518
5 to the 18th power
53
5 cubed
59
Apologies for the mistake. Let's simplify the expression correctly.
The expression given is 5653, which can be written as 5^6 / 5^3.
Using the quotient rule of exponents, we subtract the exponents:
5^6 / 5^3 = 5^(6 - 3) = 5^3 = 125.
Therefore, the simplified expression is 5^3, which is equal to 125.
The correct answer is: 125, which can be written as 5 cubed.
The expression given is 5653, which can be written as 5^6 / 5^3.
Using the quotient rule of exponents, we subtract the exponents:
5^6 / 5^3 = 5^(6 - 3) = 5^3 = 125.
Therefore, the simplified expression is 5^3, which is equal to 125.
The correct answer is: 125, which can be written as 5 cubed.
Evaluate the expression:
(10 β1 )227
(1 point)
Responses
23
2 thirds
3
3
9
9
27
(10 β1 )227
(1 point)
Responses
23
2 thirds
3
3
9
9
27
To evaluate the expression (10^(-1))^27, we need to apply the power rule of exponents.
The exponent outside the parentheses, 27, will be applied to the exponent inside the parentheses, which is -1.
Using the power rule of exponents, we multiply the exponents:
(10^(-1))^27 = 10^(-1 * 27).
Multiplying -1 and 27, we get:
10^(-27).
Therefore, the simplified expression is 10^(-27), which is equal to:
1 / 10^27.
The correct answer is: 1 over 10 to the 27th power.
The exponent outside the parentheses, 27, will be applied to the exponent inside the parentheses, which is -1.
Using the power rule of exponents, we multiply the exponents:
(10^(-1))^27 = 10^(-1 * 27).
Multiplying -1 and 27, we get:
10^(-27).
Therefore, the simplified expression is 10^(-27), which is equal to:
1 / 10^27.
The correct answer is: 1 over 10 to the 27th power.
Evaluate the following to determine the value of π:
(83)n
= 812
(2 points)
Responses
n = 9
n = 9
n = 4
n = 4
n = 2
n = 2
n = 1
(83)n
= 812
(2 points)
Responses
n = 9
n = 9
n = 4
n = 4
n = 2
n = 2
n = 1
To determine the value of π in the expression (83)^n = 812, we need to find the value that satisfies the equation.
By observing the given equation, 83 represents the base, and 812 is the result or output.
Since 8^2 = 64 and 9^2 = 81, we know that the base raised to the power of 2 is too small and the base raised to the power of 3 is too large.
Therefore, the value of π that satisfies the equation is π = 2.
The correct answer is: n = 2
By observing the given equation, 83 represents the base, and 812 is the result or output.
Since 8^2 = 64 and 9^2 = 81, we know that the base raised to the power of 2 is too small and the base raised to the power of 3 is too large.
Therefore, the value of π that satisfies the equation is π = 2.
The correct answer is: n = 2
3 answers