evaluate (8 + t)^3 - 6 when t = 2.

First, substitute t = 2 into the expression:

(8 + 2)^3 - 6
= (10)^3 - 6
= 1000 - 6
= 994

Therefore, the value of the expression is 994.

are you sure?

My apologies for the error in my previous response. Let's correct it:

(8 + t)^3 - 6
= (8 + 2)^3 - 6 (Substitute t = 2)
= (10)^3 - 6
= 1000 - 6
= 994

Therefore, the correct value of the expression is 994.

evaluate 4 + (m - n)^4 when m = 7 and n = 5.

what is the value of the expression.

Substitute m = 7 and n = 5 into the expression:

4 + (7 - 5)^4
= 4 + (2)^4
= 4 + 16
= 20

Therefore, the value of the expression is 20.

tyler has two cube shaped storage spaces in his apartment building. one large and one small. the small storage space has a volume of 12 ft^3. tyler wants to know the total volume of both storage spaces.

s = length of one side of the large storage space

which expression represents the total volume of the two storage spaces?

s^3 + 12^3
s^3 + 12
(s + 12)^3
3s + 12

The total volume of the two storage spaces would be the sum of the volume of the large storage space and the small storage space.

Since the small storage space has a volume of 12 ft^3, and the large storage space is a cube with side length s, the volume of the large storage space would be s^3.

So, the expression that represents the total volume of the two storage spaces is:

s^3 + 12

what is the total volume of both storage spaces if one side of the large storage space is 4 feet long?

? ft^3

Given that one side of the large storage space is 4 feet long, we can calculate the total volume of both storage spaces using the expression we identified earlier:

s^3 + 12

Substitute s = 4 into the expression:

4^3 + 12
= 64 + 12
= 76

Therefore, the total volume of both storage spaces would be 76 ft^3.