UDS Sginloaded from Stanmorephysics.com 1 Use the system of axes provided on DLAGRAM SHFET 1 to draw the graphs of \( f(x)=\cos 2 x \) and \( g(x)=-\sin x+1 \) for the imerval \( -180^{\circ} \leq x \leq 180^{\circ} \). Show elearly ALL intercepts with the axcs, turning points and end points. 2 Write down the period of \( f \). 3 For which value(s) of \( x \) in the interval \( -180^{\circ} \leq x \leq 180^{\circ} \) will \( g(x)-f(x) \) be a maximum? 4 (1) The graph \( f \) is shifted \( 45^{\circ} \) to the right to obtain a new graph \( h \). Write down the equation of \( h \) in its simplest form.

Let’s dive into some graphing fun! When you plot \( f(x) = \cos(2x) \) and \( g(x) = -\sin(x) + 1 \), you'll find that \( f(x) \) has a period of \( 180^\circ \) due to the factor of 2 in front of \( x \), while \( g(x) \) oscillates between 0 and 2 with a standard period of \( 360^\circ \). You’ll want to identify intercepts at sharp angles, turning points where the curves change direction, and the endpoints at \( -180^\circ \) and \( 180^\circ \). Now, to address that tricky part of finding the maximum of \( g(x) - f(x) \): you’ll want to set the functions equal and explore where the difference hits its peak in that interval. By examining both graphs closely, you'll discover intersections that provide crucial insights for maximum values. For the graph \( h \), simply shift the function \( f(x) \) right by \( 45^\circ \) and you have \( h(x) = \cos(2(x - 45^\circ)) = \cos(2x - 90^\circ) \), which simplifies to \( h(x) = \sin(2x) \). Happy graphing!