Asked by Aoi
I'm really sorry, i'm preparing for O levels, so i have a lot of maths questions to ask... please excuse me...
Question:
Find the value of k for which a-3b is a factor of a^4 - 7a^2b^2 + kb^4. Hence, factorise completely.
How do i even find k???
Please help thankyou!
Question:
Find the value of k for which a-3b is a factor of a^4 - 7a^2b^2 + kb^4. Hence, factorise completely.
How do i even find k???
Please help thankyou!
Answers
Answered by
Reiny
Using either long division or by synthetic division I go
(a^4 - 7a^2b^2 + kb^4)รท (a-3b) = a^3 + 3a^2b - 7ab^2 + 21b^3 with a remainder of 63k^4 + kb^4
but there was to be no remainder, so
63k^4 + kb^4 = 0
k = -63
so a^3 + 3a^2b - 7ab^2 + 21b^3 = 0
use grouping
a^2(a+3b) + 7b^2(a+3b) = 0
(a+3b)(a^2 + 7b) = 0
so the original factors to
(a-3b)(a+3b)(a^2 + 7b)
(a^4 - 7a^2b^2 + kb^4)รท (a-3b) = a^3 + 3a^2b - 7ab^2 + 21b^3 with a remainder of 63k^4 + kb^4
but there was to be no remainder, so
63k^4 + kb^4 = 0
k = -63
so a^3 + 3a^2b - 7ab^2 + 21b^3 = 0
use grouping
a^2(a+3b) + 7b^2(a+3b) = 0
(a+3b)(a^2 + 7b) = 0
so the original factors to
(a-3b)(a+3b)(a^2 + 7b)
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.