Help with maths? ?

4 ANSWERS

1. 
   

   i)
   
   y=x²-7x+12
   
   and
   
   y=2x²-14x+24
   
   ii)
   
   x²+y²=4
   
   x²=4-y²
   
   x=±√(4-y²)
   
   two y values for the same x value so it's not a function.
   
   iii)
   
   Volume=length x width x height
   
   V=lwh
   
   500 cm³=lwh
   
   (lwh)/2=500 cm³/2=250 cm³
   
   

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2. 
   

   1. 0=(x-3)(x-4) or 0=(2x-8)(2x-6)
   
   2. rearrange to get:
   
      y=sqrt(4-x^2)
   
     since square rooting give two answer (positive and negative) you will get               two answers for y but functions can only have one answer for y.

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3. 
   

   x^2 --(3+4)x + 3*4 = 0 Or x^2 -- 7x + 12 = 0
   
   x^2 + y^2 = 4 is an equation of a circle, centre (0, 0), radius 2.
   
   No, by halving the dimensions, volume gets 1/8 of its original value.

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4. 
   

   i)  Any polynomial of second degree can be written as:
   
   y = (x - a)(x - b) where a and  b are the roots.
   
   Therefore, you can write you quadratic equation like this:
   
   y = (x - 3)(x - 4) = x² - 3x - 4x + 12 = x² - 7x + 12
   
   To find a second one you can simply multiply y = x² - 7x + 12 by any number you feel like, lets say 2:
   
   y = 2x² - 14x + 24
   
   ii)  For a function to be algebraic it must pass the vertical line test (i.e. we can't find an x that has two y values).
   
   Therefore, let x = 0:
   
   x² + y² = 4
   
   (0)² + y² = 4
   
   y = ± 2
   
   Therefore, we've found an x, namely x = 0, that has two y values.  Therefore, x² + y² = 4 is NOT a function.
   
   iii)  
   
   Let L represent the length of the base.
   
   Let W represent the width of the base.
   
   Let H represent the height of the rectangular prism.
   
   Therefore, the volume is represented by:
   
   V = LWH
   
   Now, if we divide the dimensions by two we get that:
   
   V = (L/2)(W/2)(H/2) = (1/8)LWH
   
   This calculation shows that the statement given is false.  Looking at our new volume formula above we see that when the dimensions are halved we get 1/8 of the original volume.
   
   Hope this helps!

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