Author Topic: University placement test Maths multiple choice questions plz help.  (Read 1468 times)

Offline mdwael

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http://www.youtube.com/watch?v=C1DXvfXLj98

In this video I show 3 of the questions which I am familiar with.. but I have no clue which of the 4 answers to pick because all of them look weird.. I am perfectly fine in inequalities I did a full A level maths course but this is just weird.. Can someone mind checking and telling me which is the correct answer?
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Offline dlehddud

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Re: University placement test Maths multiple choice questions plz help.
« Reply #1 on: August 18, 2011, 11:54:34 am »
Some of these can't be done by normal A level thought processes:

1)x/(x-3)\<2

x/(x-3) - 2 \<0

x/(x-3) - 2(x-3)/(x-3) \<0

(6-x)/(x-3) \<0

Now we plot a number line, substituting some of the numbers they've given us:

------(0)----(1)----(2)----(3)----(4)----(5)----(6)--(7)--(8)---
       -ve    -ve    -ve   undef     +ve  +ve    0    -ve  -ve

From this, we can see that all values below x=3 and not including it (an undefined number cannot be part of the inequality) and everything above x=6 and including it (0 is included in the inequality) is negative or \<0

Hence, the answer is A   
Note, the round brackets mean you do not include the value, and the square brackets mean you do include the value. The infinite values are in round brackets, because you cannot include "infinity", which is not an actual number.

2)-2x^2+5x<-12

   -2x^2+5x+12<0

   2x^2 - 5x - 12<0  ....... to make it easier for ourselves

   using the quadratic formula, we get to a solution of:

  x=(5+11)/4 and x=(5-11)/4
  x=4                 x=-3/2

HOWEVER, i have only equated x with 4 and -3/2 to show you how to get the CRITICAL VALUES not the solution: we are looking at inequalities, not definite roots to quadratic equations.

Using AS level maths, we can find that

x<-3/2 and x>4

The two values not being included as shown.
Therefore, the answer is C

3)We just have to arrange and cancel out the equation to make it easier for us to comprehend:

  (x-4)/((x^2)-x-12)

  (x-4)/(x-4)(x+3) ........... factorising

  1/(x+3) ......... cancelling out x-4 terms

  Thus we only have to consider the above form of the equation. Much easier now huh :)

  No matter what we put into 1/(x+3) we will get a real number. Except x=-3. If we substitute x=-3, we get f(x) as being undefined (which is obviously not possible) and so we must exclude -3 from the domain.


Hence, the answer is A.

If you have anymore trouble understanding my explanations still, check out www.wolframalpha.com  . Type in an equation, and the site will immediately list everything you can possibly know or calculate from the equation given (graphs, alternate forms etc.)
Hope this helped, and hope I am not too late =P
   
I swear exams are going to be the end of me someday