A different perspective to transformation

Okay, many students get confused over when to do what for transformation. I thought I should try to clarify a bit. First of all, it doesn’t matter whether you translate or scale first! x and y transformations are independent so do them in whichever order you like. Most importantly, we need to understand that every single transformation gives a NEW function.

I’ll discuss a bit on how I help my students to do it safely.

So you can see it as a replacing “x” by “x+a” for example. The function f(x) becomes f(x+a) & if $f(x) = (x+1)(x-2)$ then it becomes $(x+a+1)(x+a-2)$ . We literally replace the x by x+a. This is a translation in -a units along x axis.

If we extend this and consider replace x by 2x then we have $f(2x+1)$ . We apply the same method and it gives $(2x+a+1)(2x+a-2)$ . This is a scaling by 1/2 units parallel to x axis.

Switch this around.

Consider instead we replace x by 2x first then x by x+a.

The functions will be f(x) becomes f(2x) and then $f[2(x+a)] = f(2x+2a)$ . Here we scale by 1/2 units parallel to x axis than translate by -a units along the x axis. The resultant curve will be different from previous! Of course, we can also translate by -2a units along to x axis then scale by 1/2 units parallel to x axis, that is f(x) -> f(x+2a) -> f(2x+2a).

The act of replacing x by ___ is always consistent. But please don’t write it in this manner during exam; I’m merely suggesting an alternative way to do it correctly.

Consider something else, say f(-|x|).
For this we will replace x by -x first then replace x by |x|. Other words, we reflect about y-axis first then do |x|..
You should realise that replacing x by |x| then x by -x is pretty meaningless since we have $f(x) \rightarrow f(|x|) \rightarrow f(|-x|) = f(|x|)$ . So the last transformation of -x is redundant.

Using this idea of replace x by ___, we in general do something I call like “outside in” if you want an easier brainless method.

Example: $f(-2|x|-4)$

Starting we f(x), we go for a translation of 4units in along x axis, then a reflection about y axis then scale by 1/2 parallel to x axis then |x|. So really doing from furthest of x towards x, like outside in. You can try writing it out in function terms.

Students who need further clarification, feel free to discuss. I think it is a lot easier to understand this way. 🙂

About

KS Teng

KS has been teaching H2/H1 Mathematics and IB mathematics for the more than 10 years. Having taught students from all various Junior Colleges, KS adapts to students' abilities and help them better understand the topics. As someone who loves to teach mathematics and sees it as a truly useful tool in life, KS seeks to enable students to appreciate math. Therefore, his tuition mission is to motivate and cultivate students to be independent and confident thinkers.

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