Quadratic Graph

Topic Content:

• Quadratic Graph

(a) Copy and complete the following table of values for the relation
y = 2 + x – x²

(b) Draw the graph of the relation, using a scale of 2 cm to 1 unit on each axis.

(c) Using the same axes, draw the graph of y = 1 – x.

(d) Use your curves to find the solution of the equation 1 + 2x – x² = 0 (SSCE).

Solution:

(a) y = 2 + x – x²

(b) & (c) y = 1 – x

Diagram of a Quadratic graph 

Scale: 1 unit ≡ 2 cm on both axes.

(d) 1 + 2x – x² = 0

Add 1 to both sides

I.e. 1 + 1 + 2x – x² =1

⇒ 2 + 2x – x² = 1

Subtract x from both sides

⇒      2 + 2x – x – x² = 1 – x

⇒       2 + x – x² = 1 – x

This suggests the intersection of the two curves y = 2 + x – x² and y = 1 – x

From the graph x = – 0.4 and x = 2.4

(a) Draw the graph of y = 6 – x – 2x², taking the values of x from -3 to 3

(b) On the same axes, draw the graph of 3y – 5x + 6 = 0

(c) Use your graphs to find:

(i) The solution to 6 – x – 2x² = 0
(ii) The values of x for which 3(6 – x – 2x²) = 5x – 6
(iii) The maximum value of y and the value of x for which it occurs.

(d) For what range of values of x is 6 – x – 2x² > 0?

(e) If 6 – x – 2x² = \( \frac {1}{3} \scriptsize (5x-6) \) express the intersection of the graphs in the form ax² + bx + c = 0

Solution:

(a) For y = 6 – x – 2x²

(b) 3y – 5x + 6 = 0

y = \(\frac{5x}{3} \scriptsize \:-\: 2\)

Scale: 1 Unit ≡ 1 cm on the x-axis

            2 Units ≡ 1 cm on the y-axis

(c) (i) x = -2 or x = 1.5

(ii) x = – 2.8 or x = 1.4

(iii) Y_max = 6.1 at x = -0.25

(d) What range of values of x is 6 – x – 2x² > 0?

The range of values is the part of the graph of y = 6 – x – 2x² that y is greater than 0.

Range: -2 < x < 1.5

(e) Given 6 – x – 2x² = \( \frac {1}{3} \scriptsize (5x \: – \: 6) \)

Multiply both sides by 3

i.e. 18 – 3x – 6x² = 5x – 6

6x² + 8x – 24 = 0

Divide both sides by 2

⇒       3x² + 4x – 12 = 0

⇒        3x² + 4x – 12 ≡ ax² + bx + c