The price of a visit to the dentist is $150. If the dentist fills any cavities, there is an additional charge of $50 per cavity. If the dentist finds "c" cavities, the cost of a visit is?

Evaluate the expression for the given values of the variable:
3s + 2t; s = 1, t = 1

I open a saving account with $200 and plan to put $50 per month in the account. The expression represents this situation after x number of months?

Use the distributive property to expand the expression: 4(y + 5x)

Given Expression:
4(y + 5x)
Since, the given expression is in the form of a(b+ c) we can apply Distributive Law which yields ab+ ac as a result.
Similarly, By applying the Distributive Law to 4(y + 5x):
4(y + 5x)
= $left parenthesis 4 cross times y right parenthesis plus left parenthesis 4 cross times 5 x right parenthesis$
= 4y + 20x.
Hence, the expression 4(y + 5x) becomes 4y + 20x after it's expansion.

Use the distributive property to expand the expression: 4(y + 5x)

Expand 2(8y + 15)

Given Expression:
2(8y + 15)
Since, the given expression is in the form of a(b+ c) we can apply Distributive Law which yields ab+ ac as a result.
Similarly, By applying the Distributive Law to   2(8y + 15):
2(8y + 15)
=   2(8y + 15)
= $left parenthesis 2 cross times 8 y right parenthesis plus left parenthesis 2 cross times 15 right parenthesis$
= 16y + 30.
Hence, the given Expression  2(8y + 15) becomes 16y +30 after it's expansion.

Expand 2(8y + 15)

Simplify the following using distributive property of multiplication:
3(3y–4)

Given Expression:
3(3y–4)
Since, the given expression is in the form of a(b+ c) we can apply Distributive Law which yields ab+ ac as a result.
Similarly, By applying the Distributive Law to 3(3y–4):
3(3y–4)
= $left parenthesis 3 cross times 3 y right parenthesis plus left parenthesis 3 cross times negative 4 right parenthesis$
= (9y) + (-12)
= 9y -12.
Hence, the expression 3(3y–4) becomes 9y -12 after it's expansion.

Simplify the following using distributive property of multiplication:
3(3y–4)

Expand the following using distributive property of multiplication:
2(6x − 10)

Given Expression:
2(6x − 10)
Since, the given expression is in the form of a(b+ c) we can apply Distributive Law which yields ab+ ac as a result.
Similarly, By applying the Distributive Law to 2(6x − 10) :
2(6x − 10)
= $left parenthesis 2 cross times 6 x right parenthesis plus left parenthesis 2 cross times negative 10 right parenthesis$
= (12x) + (-20)
= 12x -20.
Hence, the expression 2(6x − 10) becomes 12x -20 after it's expansion.

Expand the following using distributive property of multiplication:
2(6x − 10)

There were x cookies at the beginning of a party. By the end of the party, 16 of them had been eaten. Using x, write an expression for the number of cookies that were left.

Expand the following using distributive property of multiplication: 5(6x − 11)

Given Expression:
5(6x − 11)
Since, the given expression is in the form of a(b+ c) we can apply Distributive Law which yields ab+ ac as a result.
Similarly, By applying the Distributive Law to 5(6x − 11):
5(6x − 11)
= $left parenthesis 5 cross times 6 x right parenthesis plus left parenthesis 5 cross times negative 11 right parenthesis$
= (30x) + (-55)
= 30x -55.
Hence, the expression 5(6x − 11) becomes 30x -55 after expansion.

Expand the following using distributive property of multiplication: 5(6x − 11)

Evaluate the expression for the given value of the variable.
3x + 5 when x = 5