A LARGE PIZZA COSTS $8.95,PLUS 0.65 FOR EACH ADDITIONAL TOPPING.REMI PAID $10.90 FOR A LARGE PIZZA.HOW MAY ADDITIONAL TOPPING DID HE GET?

To determine the number of additional toppings Remi got, we can use the information given.

Let's assume Remi got x additional toppings.

The cost of the Large Pizza without any additional topping is $8.95.
The cost of each additional topping is $0.65.

So the total cost of the Large Pizza with x additional toppings can be calculated as follows:

Cost = $8.95 + $0.65 * x

According to the question, Remi paid $10.90 for the Large Pizza. So we can set up the equation:

$10.90 = $8.95 + $0.65 * x

To solve for x, we need to isolate it on one side of the equation. Let's subtract $8.95 from both sides:

$10.90 - $8.95 = $0.65 * x

$1.95 = $0.65 * x

Next, divide both sides of the equation by $0.65:

$1.95 / $0.65 = x

Simplifying the equation:

3 = x

Therefore, Remi got 3 additional toppings on his large pizza.

To find out how many additional toppings Remi got on his large pizza, we need to subtract the base cost of the pizza ($8.95) from the total amount he paid ($10.90) and divide it by the cost of each additional topping ($0.65).

Let's break it down step by step:

Step 1: Subtract the base cost of the pizza from the total amount Remi paid:
$10.90 - $8.95 = $1.95

Step 2: Divide the difference by the cost of each additional topping:
$1.95 / $0.65 = 3

Therefore, Remi got 3 additional toppings on his large pizza.

8.95+Tx0.65=10.90

8.95+T0.65=10.90
T0.65=10.90-8.95
T0.65=1.95
T=1.95/0.65
T=3

8.95+n*.65=10.90

solve for n.