The center of the rectangle is <math>(0,0)</math>, and the distance from the center to a corner is <math>\sqrt{4^2+3^2}=5</math>. The remaining two vertices of the rectangle must be another pair of points opposite each other on the circle of radius 5 centered at the origin. Let these points have the form <math>(x,y)</math> and <math>(-x,-y)</math>, where <math>x^2+y^2=25</math>. This equation has six pairs of integer solutions: <math>(\pm 4, \pm 3)</math>, <math>(\pm 4, \mp 3)</math>, <math>(\pm 3, \pm 4)</math>, <math>(\pm 3, \mp 4)</math>, <math>(\pm 5, 0)</math>, and <math>(0, \pm 5)</math>. The first pair of solutions are the endpoints of the given diagonal, and the other diagonal must span one of the other five pairs of points. <math>\Rightarrow \mathrm{(C)}</math>