1. The problem is to find the values of the function $y=2x-1$ for given $x$ values and understand how to plot the graph. 2. The formula is $y=2x-1$, which is a linear function where the slope is 2 and the y-intercept is -1. 3. To find the values, substitute each $x$ into the formula: - For $x=-2$: $$y=2(-2)-1=-4-1=-5$$ - For $x=-1$: $$y=2(-1)-1=-2-1=-3$$ - For $x=0$: $$y=2(0)-1=0-1=-1$$ - For $x=1$: $$y=2(1)-1=2-1=1$$ - For $x=2$: $$y=2(2)-1=4-1=3$$ 4. These points $(-2,-5), (-1,-3), (0,-1), (1,1), (2,3)$ can be plotted to draw the graph of the line. 5. The graph is a straight line with slope 2, meaning it rises 2 units vertically for every 1 unit it moves horizontally to the right. Final answer: The values of $y$ for $x = -2, -1, 0, 1, 2$ are $-5, -3, -1, 1, 3$ respectively.