Chapter 1.2, Problem 48E

To determine

To find: The piecewise formula for the given function.

Answer to Problem 48E

The piecewise function for the given graph of function is $y=\{\begin{array}{l}A,0\le x<\frac{T}{2}\\ -A,\frac{T}{2}\le x<T\\ A,T\le x<\frac{3T}{2}\\ -A,\frac{3T}{2}\le x\le 2T\end{array}$.

Explanation of Solution

Given information:

The graph of the function is:

  

Calculation:

The graph of the function consists of four straight lines parallel to $x$ -axis through the points $\left(0,A\right)$ , $\left(0,-A\right)$ , $\left(0,A\right)$ and $\left(0,-A\right)$.

The first line is parallel to $x$ -axis at distance of $A$ units above the $x$ -axis defined for $0\le x<\frac{T}{2}$ . So, the equation of the first line is $y=A$.

The second line is parallel to $x$ -axis at distance of $A$ units below the $x$ -axis defined for $\frac{T}{2}\le x<T$ . The equation of the second line is $y=-A$.

The third line is parallel to $x$ -axis at distance of $A$ units above the $x$ -axis defined for $T\le x<\frac{3T}{2}$ . The equation of the third line is $y=A$.

The fourth line is parallel to $x$ -axis at distance of $A$ units below the $x$ -axis defined for $\frac{3T}{2}\le x<T$.

The equation of the fourth line is $y=-A$.

Therefore, The piecewise function for the given graph of function is $y=\{\begin{array}{l}A,0\le x<\frac{T}{2}\\ -A,\frac{T}{2}\le x<T\\ A,T\le x<\frac{3T}{2}\\ -A,\frac{3T}{2}\le x\le 2T\end{array}$.