Asked by Ellie
The first two terms in the expansion of (1+ax/2)^10 + (1+bx)^10 in ascending powers of x., are 2 and 90x^2
Given that a is less than b find the values of the constants a and b . (11 marks)
Thanks :)
Given that a is less than b find the values of the constants a and b . (11 marks)
Thanks :)
Answers
Answered by
Reiny
(1+ax/2)^10 + (1+bx)^10
= (1 + 10(ax/2) + (10)(9)/2 (ax/2)^2 + ... ) + (1 + 10bx + (10)(9)/2 (bx)^2 + ...)
= 2 + (5ax + 10bx) + (45/4) a^2 x^2 + 45b x^2 + ..
= 2 + (5a+10b)x + (45/2 a^2 + 45b^2)x^2 + ...
first term matches your given, but
the 2nd only contains first degree x , not x^2
something is awry here!
= (1 + 10(ax/2) + (10)(9)/2 (ax/2)^2 + ... ) + (1 + 10bx + (10)(9)/2 (bx)^2 + ...)
= 2 + (5ax + 10bx) + (45/4) a^2 x^2 + 45b x^2 + ..
= 2 + (5a+10b)x + (45/2 a^2 + 45b^2)x^2 + ...
first term matches your given, but
the 2nd only contains first degree x , not x^2
something is awry here!
Answered by
Steve
taking a guess, we have
45/2 a^2 + 45b^2 = 90
a^2 + 2b^2 = 4
Can't think of any nonzero integers that will do the job.
45/2 a^2 + 45b^2 = 90
a^2 + 2b^2 = 4
Can't think of any nonzero integers that will do the job.
Answered by
Reiny
Unless the x term had a coeffecient of zero, then of course you wouldn't count it,
so 5a + 10b = 0 ---> a = -2b
and
45/2 a^2 + 45b^2 = 90
(45/2)(4b^2 + 45b^2 = 90
90b^2 + 45b^2 = 90
135b^2 = 90
b^2 = 90/135 = 2/3
b = ±V2/√3
if b = +√2/√2 then a = -2√2/√3
if b = -√2/√3 , then a = 2√2/√3
so 5a + 10b = 0 ---> a = -2b
and
45/2 a^2 + 45b^2 = 90
(45/2)(4b^2 + 45b^2 = 90
90b^2 + 45b^2 = 90
135b^2 = 90
b^2 = 90/135 = 2/3
b = ±V2/√3
if b = +√2/√2 then a = -2√2/√3
if b = -√2/√3 , then a = 2√2/√3
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.