To find the period of the function y = 2tanx, we need to understand the properties of the tangent function. The period of a function is the distance between two consecutive points on the graph that have the same value.

The tangent function has a period of π radians or 180 degrees. This means that the graph of y = tanx repeats itself every π radians or 180 degrees.

However, in this case, the function is y = 2tanx. The coefficient of 2 in front of the tangent function does not affect the period. It only stretches or compresses the graph vertically.

Therefore, the period of y = 2tanx is still π radians or 180 degrees.

Question

To find the period of the function y = 2tanx, we need to understand the properties of the tangent function. The period of a function is the distance between two consecutive points on the graph that have the same value.

The tangent function has a period of π radians or 180 degrees. This means that the graph of y = tanx repeats itself every π radians or 180 degrees.

However, in this case, the function is y = 2tanx. The coefficient of 2 in front of the tangent function does not affect the period. It only stretches or compresses the graph vertically.

Therefore, the period of y = 2tanx is still π radians or 180 degrees.

Knowee AI · Accepted Answer

To find the period of the function y = 2tanx, we need to understand the properties of the tangent function. The period of a function is the distance between two consecutive points on the graph that have the same value.

The tangent function has a period of π radians or 180 degrees. This means that the graph of y = tanx repeats itself every π radians or 180 degrees.

However, in this case, the function is y = 2tanx. The coefficient of 2 in front of the tangent function does not affect the period. It only stretches or compresses the graph vertically.

Therefore, the period of y = 2tanx is still π radians or 180 degrees.

The period of y = 2tanx is _____.

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