Suppose you earned 6t + 2 dollars on Monday and 9t – 6 dollars on Tuesday. What were your total

I'll be glad to check your answer.

okay, sounds gre8, thank you Ms, Sue!!!

Ummm, im not trying to be rude, but i really need that question checked for me...😐😐😐

You didn't post anything for Ms. Sue to check!

Total = 6t+2 + 9t-6 =

oh i see, oops i didnt realize that before... i feel stupid, srry Ms. sue!!!, but thank you anyway!!!!

yo bot Suppose you earned 6t + 2 dollars on Monday and 9t – 6 dollars on Tuesday. What were your total
earnings? Simplify your answer.
(1 point)
15t – 4
15t + 8
–3t – 4
–3t + 8

Your total earnings are:

6t + 2 + 9t - 6 = 15t - 4

So the correct answer is 15t - 4.

f^2 . f^3

f^2 . f^3 = f^(2+3) = f^5

100^ 12/ 100^8

100^(12/8) = 100^3 = 1,000,000.

Therefore, 100^ (12/8) equals to 1,000,000.

x^16/ x^3

x^(16-3) = x^13

4^4. 4^6

4^4 * 4^6 = 4^(4+6) = 4^10

Therefore, 4^4 * 4^6 equals to 1,048,576.

write the value of expression, 2^3/ 2^3

The expression 2^3/2^3 is equal to 1.

This is because when we have the same base number with exponents being divided, we can directly subtract the exponents:

2^3/2^3 = 2^(3-3) = 2^0

And any number raised to the power of 0 is 1.

3^3/3^6

3^3/3^6 = 1/3^(6-3) = 1/3^3 = 1/27

Therefore, 3^3/3^6 is equal to 1/27.

multiply, write the result in scientific notation, (8. 10^3) (7. 10^5)

To multiply these two numbers in scientific notation, we multiply their coefficients and add their exponents. Therefore:

(8 x 10^3) (7 x 10^5) = (8 x 7) (10^3 x 10^5) = 56 x 10^(3+5) = 56 x 10^8

Since 56 is between 1 and 10, we can rewrite the answer in scientific notation as:

5.6 x 10^9

So, (8 x 10^3) (7 x 10^5) in scientific notation is equal to 5.6 x 10^9.

(2.2 .10^-3)( 4. 10^-2)

To multiply these two numbers in scientific notation, we multiply their coefficients and add their exponents. Therefore:

(2.2 x 10^-3)(4 x 10^-2) = (2.2 x 4) (10^-3 x 10^-2) = 8.8 x 10^-5

So, (2.2 x 10^-3)(4 x 10^-2) in scientific notation is equal to 8.8 x 10^-5.

simplify the expression, 8t^5. 8t^5

To simplify the expression, we can perform the multiplication operation:

8t^5 * 8t^5 = (8 * 8) * (t^5 * t^5) = 64t^(5+5) = 64t^10

Therefore, 8t^5 * 8t^5 simplifies to 64t^10.

-4 (3x + 8)

To simplify the expression, we need to distribute the -4 to each term inside the parentheses:

-4 (3x + 8) = (-4 * 3x) + (-4 * 8) = -12x - 32

So, -4 (3x + 8) simplifies to -12x - 32.

5k^2(-6k^2 - 2k+ 6)

To simplify the expression, we need to distribute 5k^2 to each term inside the parentheses:

5k^2(-6k^2 - 2k + 6) = (5k^2 * -6k^2) + (5k^2 * -2k) + (5k^2 * 6)

= -30k^(2+2) - 10k^(2+1) + 30k^2

= -30k^4 - 10k^3 + 30k^2

Therefore, 5k^2(-6k^2 - 2k + 6) simplifies to -30k^4 - 10k^3 + 30k^2.

(-6x). 7x^2

To simplify the expression, we need to perform the multiplication:

(-6x) * (7x^2) = (-6 * 7) * (x * x^2) = -42x^(1+2) = -42x^3

Therefore, (-6x) * (7x^2) simplifies to -42x^3.

(6y^2 - 4y) + (7y^2-7y)

To simplify the expression, we need to combine like terms by adding the coefficients of same degree terms:

(6y^2 - 4y) + (7y^2 - 7y) = 6y^2 + 7y^2 - 4y - 7y

= (6y^2 + 7y^2) + (-4y - 7y) = 13y^2 - 11y

Therefore, (6y^2 - 4y) + (7y^2 - 7y) simplifies to 13y^2 - 11y.