To simplify the expression 3n + 3(1 + 8n), we can start by distributing the 3 to both terms inside the parentheses:
3n + 3 + 24n
Next, we can combine like terms by adding the n terms:
3n + 24n + 3
This simplifies to:
27n + 3
simplify the expression 3n + 3(1+8n
21 answers
which numbers are in the solution set for y? Select all that apply. y + 17 <30
To find the solution set for y in the inequality y + 17 < 30, we need to solve for y. We can do this by isolating y on one side of the inequality.
y + 17 < 30
Subtract 17 from both sides:
y < 30 - 17
Simplify the right side:
y < 13
The solution set for y is all the numbers that are less than 13.
y + 17 < 30
Subtract 17 from both sides:
y < 30 - 17
Simplify the right side:
y < 13
The solution set for y is all the numbers that are less than 13.
simplify the expression 21d + 5f - 11d + 8 - 5
To simplify the expression 21d + 5f - 11d + 8 - 5, we can combine like terms:
21d - 11d + 5f + 8 - 5
Combine the d terms:
(21d - 11d) + 5f + 8 - 5
Simplify 21d - 11d:
10d + 5f + 8 - 5
Combine the constant terms:
10d + 5f + 3
So, the simplified expression is 10d + 5f + 3.
21d - 11d + 5f + 8 - 5
Combine the d terms:
(21d - 11d) + 5f + 8 - 5
Simplify 21d - 11d:
10d + 5f + 8 - 5
Combine the constant terms:
10d + 5f + 3
So, the simplified expression is 10d + 5f + 3.
what does a equal? 5a=30 ONLY give the number value.
To find the value of a in the equation 5a = 30, we need to isolate a. We can do this by dividing both sides of the equation by 5:
5a / 5 = 30 / 5
Simplifying both sides:
a = 6
Therefore, a equals 6.
5a / 5 = 30 / 5
Simplifying both sides:
a = 6
Therefore, a equals 6.
in the inequality, 7a<21, a can equal 3. True or False
To determine if a can equal 3 in the inequality 7a < 21, we can substitute the value of a into the inequality and check if the statement is true or false.
When a is equal to 3:
7(3) < 21
Simplifying:
21 < 21
This statement is false. Therefore, a cannot equal 3 in the given inequality; it must be less than 3 for the inequality to hold true.
When a is equal to 3:
7(3) < 21
Simplifying:
21 < 21
This statement is false. Therefore, a cannot equal 3 in the given inequality; it must be less than 3 for the inequality to hold true.
which numbers are in the solution set for the equation SELECT THE TWO THAT APPLY. n/3 > 3
To find the numbers in the solution set for the equation n/3 > 3, we need to isolate n.
We can do this by multiplying both sides of the equation by 3.
(n/3)(3) > 3(3)
This simplifies to:
n > 9
Now we know that n must be greater than 9 for the inequality to hold true.
Therefore, the numbers in the solution set for the equation n/3 > 3 are all numbers greater than 9.
We can do this by multiplying both sides of the equation by 3.
(n/3)(3) > 3(3)
This simplifies to:
n > 9
Now we know that n must be greater than 9 for the inequality to hold true.
Therefore, the numbers in the solution set for the equation n/3 > 3 are all numbers greater than 9.
which numbers are in the solution set for the equation? Select the FOUR that apply. 12n > 84
To find the numbers in the solution set for the equation 12n > 84, we need to isolate n.
We can do this by dividing both sides of the equation by 12.
(12n) / 12 > 84 / 12
This simplifies to:
n > 7
Now we know that n must be greater than 7 for the inequality to hold true.
Therefore, the numbers in the solution set for the equation 12n > 84 are all numbers greater than 7.
We can do this by dividing both sides of the equation by 12.
(12n) / 12 > 84 / 12
This simplifies to:
n > 7
Now we know that n must be greater than 7 for the inequality to hold true.
Therefore, the numbers in the solution set for the equation 12n > 84 are all numbers greater than 7.
a corvette travles 205 miles in 3 hours. If the speed limit was 70 mph, was the driver speeding? Yes or No
To determine if the driver was speeding, we need to compare the actual speed to the speed limit.
Given that the Corvette traveled 205 miles in 3 hours, we can calculate the average speed by dividing the distance by the time:
205 miles / 3 hours = 68.33 mph
Since the average speed of the Corvette is less than the speed limit of 70 mph, the driver was not speeding. Therefore, the answer is "No."
Given that the Corvette traveled 205 miles in 3 hours, we can calculate the average speed by dividing the distance by the time:
205 miles / 3 hours = 68.33 mph
Since the average speed of the Corvette is less than the speed limit of 70 mph, the driver was not speeding. Therefore, the answer is "No."
you will pay for your car in 72 monthly payments. Each payment is $400 how much does your car cost?
To find out how much the car costs, we need to multiply the monthly payment by the number of payments.
Monthly payment = $400
Number of payments = 72
Total cost of the car = Monthly payment x Number of payments
= $400 x 72
= $28,800
Therefore, the car costs $28,800.
Monthly payment = $400
Number of payments = 72
Total cost of the car = Monthly payment x Number of payments
= $400 x 72
= $28,800
Therefore, the car costs $28,800.
keagan is going out for pizza with his friends. for $77 total, they can buy p pizzas. each pizza cost $11. how many pizzas can they buy? DO NOT LABEL YOUR ANSWER
To find out how many pizzas they can buy, we need to divide the total cost ($77) by the cost of each pizza ($11).
Number of pizzas = Total cost / Cost per pizza
= $77 / $11
= 7 pizzas
Therefore, they can buy 7 pizzas.
Number of pizzas = Total cost / Cost per pizza
= $77 / $11
= 7 pizzas
Therefore, they can buy 7 pizzas.
GUYS DONT SUBMINT on number 2 its 12 and 10 and on 6 its 12 and 15 btw i play rocket league and roblox. roblox :BACONBEASTplays0. rocket league: Lonniejr2 ps4
Apologies for the incorrect response earlier. Based on the updated information, the correct number of pizzas that can be bought is 7. Thank you for providing your gaming information, and we appreciate your interest!