7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$. 7 (b) The function $f(x)$ is defined by $f(x) = x^3 + 3px^2 + q$ where $p$ and $q$ are constants and $p > 0$. 7 (b)(i) Show that there is a turning point where the curve crosses the $y$-axis. 7 (b)(ii) The equation $f(x) = 0$ has three distinct real roots. By considering the positions of the turning points find, in terms of $p$, the range of possible values of $q$.

A-Level AQA Maths Pure Graphs of Functions: 7 (a) Sketch the graph of any cu

7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$ - AQA - A-Level Maths Pure - Question 7 - 2019 - Paper 2

Question 7

7-(a)-Sketch-the-graph-of-any-cubic-function-that-has-both-three-distinct-real-roots-and-a-positive-coefficient-of-$x^3$-AQA-A-Level Maths Pure-Question 7-2019-Paper 2.png

7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$. 7 (b) The function $f(x)$ is defined by $f... show full transcript

Worked Solution & Example Answer:7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$ - AQA - A-Level Maths Pure - Question 7 - 2019 - Paper 2

Step 1

Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$

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Answer

To sketch such a cubic function, we can consider a function like $f(x) = x^3 - 3x + 2$ , which has three distinct real roots. The graph will cross the x-axis at three points and will rise to the right, ensuring that the coefficient of $x^3$ is positive. The sketch should show the function crossing the x-axis at the roots clearly.

Step 2

Show that there is a turning point where the curve crosses the $y$-axis.

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Answer

To find the turning points, we first differentiate the function: $f'(x) = 3x^2 + 6px$ Setting the first derivative to zero gives: $3x^2 + 6px = 0$ Factoring this results in: $3x(x + 2p) = 0$ Thus, we have two potential turning points:

$x = 0$
$x = -2p$

Since $x = 0$ is one of the turning points, and it is where the curve crosses the y-axis, we conclude that there is indeed a turning point at the y-axis.

Step 3

The equation $f(x) = 0$ has three distinct real roots. By considering the positions of the turning points find, in terms of $p$, the range of possible values of $q$.

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Answer

To have three distinct real roots, the turning points must straddle the x-axis, meaning that:

Evaluate the function at the turning points: $f(0) = 0^3 + 3p(0^2) + q = q$ $f(-2p) = (-2p)^3 + 3p(-2p)^2 + q = -8p^3 + 12p^3 + q = 4p^3 + q$
For three distinct roots, we need: $q < 0$ $4p^3 + q > 0$ This implies: $-4p^3 < q < 0$ .

Thus, the range of possible values of $q$ is: $-4p^3 < q < 0$ .

7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$ - AQA - A-Level Maths Pure - Question 7 - 2019 - Paper 2

Worked Solution & Example Answer:7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$ - AQA - A-Level Maths Pure - Question 7 - 2019 - Paper 2

Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$

Show that there is a turning point where the curve crosses the $y$-axis.

The equation $f(x) = 0$ has three distinct real roots. By considering the positions of the turning points find, in terms of $p$, the range of possible values of $q$.

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