The Center for Science and Industry sells adult tickets for $13 and children's tickets for $9. The expression 13a +9c represents the total revenue from selling a adult tickets and c children's tickets. Evaluate the algebraic expression 13a + 9c for a = 165 and c = 467.

Question

The Center for Science and Industry sells adult tickets for $13 and children's tickets for $9. The expression 13a +9c represents the total revenue from selling a adult tickets and c children's tickets. Evaluate the algebraic expression 13a + 9c for a = 165 and c = 467.

The total revenue for a = 165 and c = 467 is what? simplify the result

Answer 1

To evaluate the algebraic expression 13a + 9c for a = 165 and c = 467, we substitute the given values into the expression:

13(165) + 9(467)

Multiplying:

2145 + 4203

Adding:

6348

Therefore, the total revenue for a = 165 and c = 467 is $6348.

Answer 2

The width of a rectangle is w yards and the length of the rectangle is (6w - 7) yards. The perimeter of the rectangle is given by the algebraic expression 2w + 2(6w - 7). Simplify the algebraic expression 2w+ 2( 6w - 7) and determine the perimeter of a rectangle whose width w is 2 yards.

Simplify the algebraic expression 2w+ 2( 6w - 7)

2w+ 2( 6w - 7) = [ ]

Answer 3

To simplify the algebraic expression 2w + 2(6w - 7), we follow the order of operations, which states that we should perform operations within parentheses first:

2w + 2(6w - 7) = 2w + 12w - 14

Next, we can combine like terms:

= (2w + 12w) - 14

= 14w - 14

Therefore, the simplified algebraic expression 2w + 2(6w - 7) is 14w - 14.

To determine the perimeter of a rectangle whose width w is 2 yards, we substitute the value into the expression:

Perimeter = 14w - 14
Perimeter = 14(2) - 14
Perimeter = 28 - 14
Perimeter = 14

Therefore, the perimeter of the rectangle with a width of 2 yards is 14 yards.

Answer 4

2w + 2 (6w - 7 ) =

Answer 5

To simplify the expression 2w + 2(6w - 7), we need to use the distributive property:

2w + 2(6w - 7) = 2w + 2 * 6w - 2 * 7

Now, we can simplify by performing the multiplication:

= 2w + 12w - 14

Next, we can combine like terms:

= 14w - 14

Therefore, the simplified expression for 2w + 2(6w - 7) is 14w - 14.

Answer 6

What is the perimeter of the rectangle whose width w is 2 yards?

[ ] yards

Answer 7

To find the perimeter of the rectangle when the width w is 2 yards, we substitute w = 2 into the expression we simplified earlier:

Perimeter = 14w - 14

Plugging in w = 2:

Perimeter = 14(2) - 14
Perimeter = 28 - 14
Perimeter = 14 yards

Therefore, the perimeter of the rectangle when the width is 2 yards is 14 yards.

Answer 8

Use the distributive property to remove the parentheses.

- (8x - 8y)

- (8x - 8y) = [ ]

Answer 9

To use the distributive property to remove the parentheses in - (8x - 8y), we need to distribute the negative sign to each term inside the parentheses:

- (8x - 8y) = -8x + 8y

Therefore, when we remove the parentheses using the distributive property, - (8x - 8y) simplifies to -8x + 8y.

Answer 10

Simplify each expression by combining like terms.

-8(n - 4) + 2 ( n + 1)

-8(n - 4) + 2 ( n + 1) = [ ]

The Center for Science and Industry sells adult tickets for $13 and​ children's tickets for $9. The expression 13a +9c represents the total revenue from selling a adult tickets and c​ children's tickets. Evaluate the algebraic expression 13a + 9c for a = 165 and c = 467.

To evaluate the algebraic expression 13a + 9c for a = 165 and c = 467, we substitute the given values into the expression:

The width of a rectangle is w yards and the length of the rectangle is (6w - 7) yards. The perimeter of the rectangle is given by the algebraic expression 2w + 2(6w - 7). Simplify the algebraic expression 2w+ 2( 6w - 7) and determine the perimeter of a rectangle whose width w is 2 yards.

To simplify the algebraic expression 2w + 2(6w - 7), we follow the order of operations, which states that we should perform operations within parentheses first:

2w + 2 (6w - 7 ) =

To simplify the expression 2w + 2(6w - 7), we need to use the distributive property:

What is the perimeter of the rectangle whose width w is 2 yards?

To find the perimeter of the rectangle when the width w is 2 yards, we substitute w = 2 into the expression we simplified earlier:

Use the distributive property to remove the parentheses.

To use the distributive property to remove the parentheses in - (8x - 8y), we need to distribute the negative sign to each term inside the parentheses:

Simplify each expression by combining like terms.

The Center for Science and Industry sells adult tickets for $13 and children's tickets for $9. The expression 13a +9c represents the total revenue from selling a adult tickets and c children's tickets. Evaluate the algebraic expression 13a + 9c for a = 165 and c = 467.