Solve using reverse Pemdas.
8p + 1/3 = 17
To solve using reverse PEMDAS, we start by isolating the variable on one side of the equation.
First, we subtract 1/3 from both sides to get rid of the fraction:
8p = 17 - 1/3
Next, we simplify the right side of the equation:
8p = 17 - 1/3
8p = 51/3 - 1/3
8p = 50/3
Now, we divide both sides by 8 to solve for p:
(8p)/8 = (50/3)/8
p = 50/24
So the solution is p = 50/24, which can be simplified to p = 25/12.
To solve the equation using reverse PEMDAS, we will follow the reverse order of operations.
Step 1: Simplify the equation by subtracting 1/3 from both sides:
8p = 17 - 1/3
Step 2: Get a common denominator on the right side:
8p = (17*3)/3 - 1/3
8p = 51/3 - 1/3
8p = 50/3
Step 3: Divide both sides of the equation by 8 to isolate the variable p:
(8p)/8 = (50/3)/8
p = 50/3 divided by 8
Step 4: Simplify the division on the right side:
p = (50/3) * (1/8)
p = 50/24
Step 5: Simplify the fraction if possible:
p = 25/12
So the solution to the equation using reverse PEMDAS is p = 25/12.
To solve the equation 8p + 1/3 = 17 using reverse PEMDAS, we need to isolate the variable "p" by performing the reverse order of operations.
1. Distribute any terms if needed: There are no terms to distribute in this case.
2. Move any constant terms to the other side: We'll start by moving the constant term 1/3 to the right side of the equation. To cancel out the addition of 1/3, we can subtract 1/3 from both sides of the equation:
8p + 1/3 - 1/3 = 17 - 1/3
8p = 17 - 1/3
3. Simplify the constant terms: The right side of the equation, 17 - 1/3, can be simplified by finding a common denominator:
8p = (51/3) - (1/3)
8p = 50/3
4. Divide by the coefficient: Since 8 is multiplied by p, we need to divide both sides of the equation by 8 to solve for p:
(8p)/8 = (50/3)/8
p = 25/12
Therefore, the solution to the equation 8p + 1/3 = 17 using reverse PEMDAS is p = 25/12.