Find the sum of P & QFP equals 3/4 and Q equals -11/4 reduced your answer to the lowest term
If P + QFP = 3/4 and Q = -11/4, we can substitute the value of Q into the equation to solve for P.
P + (-11/4)FP = 3/4
Now, let's reduce the equation by multiplying every term by 4 to eliminate the fractions:
4P + (-11)FP = 3
Dividing every term by F:
4P/F - 11P = 3
Bringing like terms together:
(4P/F) - 11P - 3 = 0
To find the sum of P and QFP, we need to solve for F and substitute it back into the equation.
Unfortunately, without any information or constraints about the values of F, it is not possible to determine the sum of P and QFP.
To find the sum of P and Q, we need to add their values.
Given:
QFP = 3/4
Q = -11/4
Let's represent P as "P".
P + QFP = 3/4
Substituting the value of QFP, we have:
P + 3/4 = 3/4
Now, let's solve for P by isolating it on one side of the equation:
P = 3/4 - 3/4
P = 0/4
So, P is equal to 0.
Now, let's find the sum of P and Q:
P + Q = 0 + (-11/4)
To add fractions, the denominators must be the same. So, let's convert 0 to a fraction with a denominator of 4:
0 = 0/4
Now, we can add the fractions:
P + Q = 0/4 + (-11/4)
P + Q = -11/4
Therefore, the sum of P and Q is -11/4.