How do you graph y = -2tan(x+(pi/4))y=2tan(x+(π4))?

1 Answer
Anuj Baskota
Nov 15, 2016

graph{ -2tan(x+(pi/4)) [-10, 10, -5, 5]}

Required graph.

Explanation:

For the graphing questions, I always follow this way which is quite easy.

Firstly, Look at the trigonometric function which in this case is tantan. You need to know the graph of y= tanxy=tanx. graph{tanx [-8.89, 8.89, -4.444, 4.445]}

Secondly, for the period of the function, look for the coefficient of xx which in this case is 1. So the period of this graph is same as that of y= tanxy=tanx.

Thirdly, In (x+(pi/4))(x+(π4)) , if there is use of + sign, it means shifting the whole graph left. If there is - sign, then we have to shift the whole graph right. In this case, we have to shift it left.

graph{tan(x+(pi/4)) [-8.89, 8.89, -4.444, 4.445]}

Now,
Look for the coefficient of the trigonometric function which in this case is 2. So, if tan(pi/4) tan(π4) gives yy= 1, then 2tan(pi/4) tan(π4) gives yy= 2. Multiply every outcomes by 2. You do not have to do it for every yy but some just to know the shape.
graph{2tan(x+(pi/4)) [-8.89, 8.89, -4.444, 4.445]}

Lastly, the minus sign will rotate the graph via x-axis. X-axis would act as the mirror.
graph {-2tan(x+(pi/4)) [-8.89, 8.89, -4.444, 4.445]}

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