QUESTION IMAGE
Question
question 1-4
match each polynomial with a factoring technique. if none of the techniques can be used to factor the polynomial, select none.
| factor by grouping | difference of squares | perfect square trinomial | none | |
|---|---|---|---|---|
| $16m^2 + 40mn + 25n^2$ | $\square$ | $\square$ | $\square$ | $\square$ |
| $64d^2 + 9$ | $\square$ | $\square$ | $\square$ | $\square$ |
| $9a^2 - 36b^2$ | $\square$ | $\square$ | $\square$ | $\square$ |
For \( 8xy + 4y + 10x + 5 \)
Step1: Group terms
Group as \( (8xy + 4y) + (10x + 5) \)
Step2: Factor each group
Factor \( 4y \) from first group: \( 4y(2x + 1) \), factor \( 5 \) from second group: \( 5(2x + 1) \)
Step3: Factor out common binomial
Factor out \( (2x + 1) \): \( (4y + 5)(2x + 1) \), so factor by grouping applies.
Step1: Check perfect square trinomial form
A perfect square trinomial is \( (a + b)^2 = a^2 + 2ab + b^2 \). Here, \( a = 4m \), \( b = 5n \), \( 2ab = 2(4m)(5n)=40mn \), \( a^2 = 16m^2 \), \( b^2 = 25n^2 \), so it's \( (4m + 5n)^2 \), so perfect square trinomial applies.
Step1: Check difference of squares (needs \( a^2 - b^2 \)), but this is \( (8d)^2 + 3^2 \), sum of squares (not factorable over reals with these techniques), and not groupable or perfect square trinomial. So none applies.
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Factor by grouping (check the box for \( 8xy + 4y + 10x + 5 \) under "Factor by grouping")