Answer:
q = 8
Step-by-step explanation:
Given the 2 equations
p + q = 36 → (1)
p - q = 20 → (2)
Add the 2 equations term by term
2p = 56 ( divide both sides by 2 )
p = 28
Substitute p = 28 into (1)
28 + q = 36 ( subtract 28 from both sides )
q = 8
If p + q = 36, and p -q = 20, then q = B
The given question is an example of an algebraic equation that involves the use of BODMAS and the substitution method.
Let
From equation (1)
Let p = 36 - q.
Then we can substitute the value of p into equation (2)
p - q = 20
36 - q - q = 20
36 - 2q = 20
collecting the like terms
-2q = 20 - 36
- 2q = - 16
Divide both sides by (-2)
q = -16/-2
q = 8
Therefore, we can conclude that the value of q = 8
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