This item is taken from Cambridge International AS and A Level Mathematics (9709) Pure Mathematics 1 Paper 13 of May/June 2010.
--------------------------------------------------------------------------------------------------------------------------
To deal with this item, let us summarize the details of the problem:
(a) Syllabus area: Functions
(b) Formula/Concept needed:
> completed square form of quadratics
> discriminant (b^2 - 4ac)
> domain and range of functions
> inverse of a function
We are done with part (i) in the previous post.
For (ii), let us encircle the main concept.
The first step is to get the highest common numerical factor of the first group. That is
Simplify each group.
Hence, the completed square form of 2x^2 - 8x + 14 is 2(x - 2)^2 + 6 where a = 2, b = 2 and c = 6.
There is another way of completing the square. However, I would suggest you use this 2nd method if the coefficient of the 2nd term and the constant are both divisible by 2. It might be confusing for you later to deal with fractions.
[End of Part 2]
----------------------------------------------------------------------------------------------------------------------------------------------------
Your comments and suggestions are welcome here. Write them in the comment box below.
Thank you and God bless!
Thank you and God bless!
Isn't the b = -2? due to the question asking to express the function in a(x+b)^2+c and not in a(x-b)^+c
ReplyDeleteYes, that is correct! Thank you for the correction. The answer is the completed square form anyway.
Delete