Answer:
(5aβ3)^2
Step-by-step explanation:
25a^2 - 30a + 9
Factor the expression by grouping. First, the expression needs to be rewritten as 25a^2+pa+qa+9. To find p and q, set up a system to be solved.
p+q=β30
pq=25Γ9=225
Since pq is positive, p and q have the same sign. Since p+q is negative, p and q are both negative. List all such integer pairs that give product 225.
β1,β225
β3,β75
β5,β45
β9,β25
β15,β15
Calculate the sum for each pair.
β1β225=β226
β3β75=β78
β5β45=β50
β9β25=β34
β15β15=β30
The solution is the pair that gives sum β30.
p=β15
q=β15
Rewrite 25a^2 - 30a + 9 as (25a^2β15a)+(β15a+9).
(25a^2β15a)+(β15a+9)
Factor out 5a in the first and β3 in the second group.
5a(5aβ3)β3(5aβ3)
Factor out common term 5aβ3 by using distributive property.
(5aβ3)(5aβ3)
Rewrite as a binomial square.
(5aβ3)^2
