IB DP Maths Topic 2.7 Solving ax2+bx+c=0 , a≠0 . SL Paper 1

Question

Solve \({\log _2}x + {\log _2}(x – 2) = 3\) , for \(x > 2\) .

Answer/Explanation

Markscheme

recognizing \(\log a + \log b = \log ab\) (seen anywhere)     (A1)

e.g. \({\log _2}(x(x – 2))\) , \({x^2} – 2x\)

recognizing \({\log _a}b = x \Leftrightarrow {a^x} = b\)     (A1)

e.g. \({2^3} = 8\)

correct simplification     A1

e.g. \(x(x – 2) = {2^3}\) , \({x^2} – 2x – 8\)

evidence of correct approach to solve     (M1)

e.g. factorizing, quadratic formula

correct working     A1

e.g. \((x – 4)(x + 2)\) , \(\frac{{2 \pm \sqrt {36} }}{2}\)

\(x = 4\)     A2     N3

[7 marks]

Question

Let \(f(x) = {x^2} + x – 6\).

Write down the \(y\)-intercept of the graph of \(f\).

[1]
a.

Solve \(f(x) = 0\).

[3]
b.

On the following grid, sketch the graph of \(f\), for \( – 4 \le x \le 3\).

[3]
c.
Answer/Explanation

Markscheme

\(y\)-intercept is \( – 6,{\text{ }}(0,{\text{ }} – 6),{\text{ }}y =  – 6\)     A1

[1 mark]

a.

valid attempt to solve     (M1)

eg\(\;\;\;(x – 2)(x + 3) = 0,{\text{ }}x = \frac{{ – 1 \pm \sqrt {1 + 24} }}{2}\), one correct answer

\(x = 2,{\text{ }}x =  – 3\)     A1A1     N3

[3 marks]

b.

    A1A1A1

Note:     The shape must be an approximately correct concave up parabola. Only if the shape is correct, award the following:

A1 for the \(y\)-intercept in circle and the vertex approximately on \(x =  – \frac{1}{2}\), below \(y =  – 6\),

A1 for both the \(x\)-intercepts in circles,

A1 for both end points in ovals.

[3 marks]

Total [7 marks]

c.

Examiners report

Parts (a) and (b) of this question were answered quite well by nearly all candidates, with only a few factoring errors in part (b).

a.

Parts (a) and (b) of this question were answered quite well by nearly all candidates, with only a few factoring errors in part (b).

b.

In part (c), although most candidates were familiar with the general parabolic shape of the graph, many placed the vertex at the \(y\)-intercept \((0,{\text{ }} – 6)\), and very few candidates considered the endpoints of the function with the given domain.

c.
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