Write an English phrase that would translate into the following mathematical expression.

The product of 6 and z, subtracted by 8.

Translate to an algebraic expression.
9 less than t

t - 9

Write the phrase as a mathematical expression. 6 more than 2 times x

2x + 6

Write an algebraic expression for the following word phrase. 8.61 less than the product of 42 and x

42x - 8.61

A bagel shop sells bagels by the baker's dozen. The table at the right shows the number of bagels a shop gives per ​"​baker's dozen" ordered. Write an algebraic expression that gives the rule for finding the number of bagels in any number b of baker's dozens.

The algebraic expression that gives the rule for finding the number of bagels in any number b of baker's dozens is:

13b

3(x^2+5) is an example of which of the​ following?

The expression 3(x^2+5) is an example of a simplified algebraic expression.

Simplify the expression.
(4^2-2^3) divided by 7

To simplify the expression (4^2-2^3) divided by 7, we can start by evaluating the exponents:

(4^2-2^3) divided by 7

= (16 - 8) divided by 7

Next, we perform the subtraction:

= 8 divided by 7

Therefore, the simplified expression is 8/7.

evaluate (4/9)^2

To evaluate (4/9)^2, we square the fraction (4/9):

(4/9)^2 = (4/9) x (4/9) = 16/81

Thus, (4/9)^2 equals 16/81.

Evaluate the expression below for s = 2 and t = 7.
4st^2 - s^2 =

To evaluate the expression 4st^2 - s^2 for s = 2 and t = 7, we substitute those values into the expression:

4(2)(7)^2 - (2)^2

= 4(2)(49) - 4

= 392 - 4

= 388

Therefore, when s = 2 and t = 7, the expression 4st^2 - s^2 evaluates to 388.

Simplify the following expression. 3[(9-6)^5 divided by 9]

To simplify the expression 3[(9-6)^5 divided by 9], we start by evaluating the exponent inside the parentheses:

(9-6)^5 = 3^5 = 243

Next, we divide 243 by 9:

243 divided by 9 = 27

Finally, we multiply 27 by 3:

3 × 27 = 81

Therefore, the simplified expression is 81.