To evaluate the expression 2(s + t)^3 - 6 when s = 3 and t = 2, we substitute the values of s and t into the expression:
2(3 + 2)^3 - 6
= 2(5)^3 - 6
= 2(125) - 6
= 250 - 6
= 244
Therefore, the value of the expression is 244.
evaluate 2(s + t)^3 - 6 when s = 3 and t = 2
what is the value of the expression?
11 answers
sushmila is buying Mehndi supplies. She has a coupon for $5 off each package of henna powder. She plans to buy 3 packages of henna powder and 2 squeeze bottles.
p = price of package of henna powder
s = price of a squeeze bottle
which expression represents sushmilas total cost for the supplies?
3(p - 5 + 2s)
3(p - 5) + 2s
3p - 5 + 2s
3p + 2(s - 5)
p = price of package of henna powder
s = price of a squeeze bottle
which expression represents sushmilas total cost for the supplies?
3(p - 5 + 2s)
3(p - 5) + 2s
3p - 5 + 2s
3p + 2(s - 5)
To represent Sushmila's total cost for the supplies, we need to consider the total cost of the 3 packages of henna powder and 2 squeeze bottles after applying the coupon for the henna powder.
Given:
Coupon for henna powder = $5 off each package
Expression to represent Sushmila's total cost for the supplies:
3(p - 5) + 2s
Explanation:
- 3(p - 5) represents the cost of 3 henna powder packages after the $5 coupon is applied to each package.
- 2s represents the cost of 2 squeeze bottles without any discounts.
Therefore, the correct expression is: 3(p - 5) + 2s
Given:
Coupon for henna powder = $5 off each package
Expression to represent Sushmila's total cost for the supplies:
3(p - 5) + 2s
Explanation:
- 3(p - 5) represents the cost of 3 henna powder packages after the $5 coupon is applied to each package.
- 2s represents the cost of 2 squeeze bottles without any discounts.
Therefore, the correct expression is: 3(p - 5) + 2s
the packages of henna powder cost 12$ each and the squeeze bottles cost 3$. what is sushmilas total cost for the supplies
Given that each package of henna powder costs $12 and each squeeze bottle costs $3, we can calculate Sushmila's total cost for the supplies using the expression we derived earlier:
3(p - 5) + 2s
Substitute the prices:
3(12 - 5) + 2(3)
= 3(7) + 6
= 21 + 6
= $27
Therefore, Sushmila's total cost for the supplies would be $27.
3(p - 5) + 2s
Substitute the prices:
3(12 - 5) + 2(3)
= 3(7) + 6
= 21 + 6
= $27
Therefore, Sushmila's total cost for the supplies would be $27.
jess makes and sells cube shaped jewelry boxes. she designs the jewelry boxes in different sizes and with different patterns. jess wants to include the volume of each box on her price list.
s = length of one side of the jewelry box
which expression represents the volume of the jewelry box?
6s s s^3 s^2
s = length of one side of the jewelry box
which expression represents the volume of the jewelry box?
6s s s^3 s^2
The expression that represents the volume of a cube-shaped jewelry box is:
s^3
Explanation:
- The volume of a cube is calculated by cubing the length of one side (s) of the cube.
- When we cube a side length (s), we are essentially finding the volume of a cube since all sides of a cube are equal.
Therefore, the correct expression for the volume of the jewelry box is s^3.
s^3
Explanation:
- The volume of a cube is calculated by cubing the length of one side (s) of the cube.
- When we cube a side length (s), we are essentially finding the volume of a cube since all sides of a cube are equal.
Therefore, the correct expression for the volume of the jewelry box is s^3.
when jess mails a jewelry box to a customer she packs it inside a larger shipping box. the sides of a shipping box are 2 inches longer than the sides of a jewelry box.
which expression represents the volume of a shipping box?
s + 2^3 s(2^3) (s x 2)^3 (s + 2)^3
which expression represents the volume of a shipping box?
s + 2^3 s(2^3) (s x 2)^3 (s + 2)^3
Let's denote the side length of the jewelry box as s. Since the sides of the shipping box are 2 inches longer than the sides of the jewelry box, the side length of the shipping box would be s + 2.
The volume of a cube, including both the jewelry box and the shipping box, is calculated by cubing the side length. Therefore, the expression that represents the volume of the shipping box would be:
(s + 2)^3
Explanation:
- The expression (s + 2)^3 means that we are cubing the side length of the shipping box, which in this case is s + 2.
- This expression represents the volume of the shipping box.
Therefore, the correct expression representing the volume of the shipping box is (s + 2)^3.
The volume of a cube, including both the jewelry box and the shipping box, is calculated by cubing the side length. Therefore, the expression that represents the volume of the shipping box would be:
(s + 2)^3
Explanation:
- The expression (s + 2)^3 means that we are cubing the side length of the shipping box, which in this case is s + 2.
- This expression represents the volume of the shipping box.
Therefore, the correct expression representing the volume of the shipping box is (s + 2)^3.
jess is mailing a jewelry box with sides that are 8 inches long. what is the volume of the shipping box?
__in.^3
__in.^3
Given that the side length of the jewelry box is 8 inches, the side length of the shipping box would be 8 + 2 = 10 inches.
To find the volume of the shipping box, we use the expression (s + 2)^3 with s = 8:
(8 + 2)^3
= 10^3
= 10 x 10 x 10
= 1000
Therefore, the volume of the shipping box is 1000 cubic inches.
To find the volume of the shipping box, we use the expression (s + 2)^3 with s = 8:
(8 + 2)^3
= 10^3
= 10 x 10 x 10
= 1000
Therefore, the volume of the shipping box is 1000 cubic inches.
1 answer