Please Factor
(m + 4) (a – 5) + (m + 4) (a + 3)
don't know what � is but I see a common factor of (m+4)
so
(m + 4) (a � 5) + (m + 4) (a + 3)
= (m+4)(a � 5 + a + 3)
finish the last bracket once you figure out what that strange symbol is
So is the answer
(m + 4) (2a – 2) OR
(m + 4) (a^2 – 2)
To factor the given expression:
Step 1: Identify the common factor
The common factor in the given expression is (m + 4).
Step 2: Apply the distributive property
Apply the distributive property to each term in the expression, using the common factor:
(m + 4) (a – 5) + (m + 4) (a + 3) = [(m + 4) * a – (m + 4) * 5] + [(m + 4) * a + (m + 4) * 3]
Step 3: Simplify each term
Simplify each term by expanding the parentheses:
[(m * a + 4a) – (5m + 20)] + [(m * a + 4a) + (3m + 12)]
Step 4: Combine like terms
Combine the like terms in each set of parentheses:
[(m * a + 4a – 5m – 20)] + [(m * a + 4a + 3m + 12)]
Step 5: Combine the terms outside the parentheses
Combine the terms outside the parentheses by adding or subtracting:
(m * a + 4a – 5m – 20) + (m * a + 4a + 3m + 12)
Step 6: Simplify further if possible
Combine the like terms:
2m * a + 8a – 2m – 8
Therefore, the factored form of the given expression is 2m * a + 8a – 2m – 8.