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Each column and row heading in the following table is a property that a function may or may not have. A function can appear in a cell if it has the properties in the corresponding row and column.
We have omitted some headings, and some entries in cells. Can you complete the table?
You might find it helpful to draw some sketches. You could use graph-sketching software such as Desmos to help you, but try to do the sketching by hand first, before reaching for a computer or calculator!
Make sure that you can explain why each function has the desired properties.
$y$-axis is an asymptote | passes through origin | |||
---|---|---|---|---|
$x = 1$ is a root | $y = \vert x-1\vert$ | $y = -3x+3$ | ||
has exactly two roots | $y = x(x-2)$ | |||
$y = \dfrac{1}{x}$ for $x \neq 0$ | $y = \dfrac{1}{(x-1)^2}$ for $x \neq 1$ | $y = \dfrac{3}{x+1}$ for $x \neq -1$ | ||
$y \to \infty$ as $x \to \infty$ | $y = 2+(x-1)^4$ |
Can you complete the table using a different function in every cell? By contrast, how few different functions can you use in the table?
Did you have any choice about the column and row headings?
This comes in two parts, with the first being less fiendish than the second. It’s great for practising both quadratics and laws of indices, and you can get a lot from making sure that you find all the solutions. For a real challenge (requiring a bit more knowledge), you could consider finding the complex solutions.
You're invited to decide whether statements about the number of solutions of a quadratic equation are always, sometimes or never true.
This will encourage you to think about whether all quadratics can be factorised and to develop a better understanding of the effect that changing the coefficients has on the factorised form.