(A) Here, the slope dtdx≥0 is always increasing, and we know that the derivative graph of the parabola is straight line, so the graph of velocity-time is straight line with increasing slope.
(A−II)
(B) Here, the slope dtdx<0andatt→∞,dtdx→0. As the slope is decreasing with time, so the graph of velocity-time will have negative velocity and positive slope.
(B−IV)
(C) Here, the slope dtdx>0forfirsthalfanddtdx<0forsecondhalf.
As the slope of displacement-time is positive constant in first half and negative constant in second half, so the velocity will be uniform positive and uniform negative value.
(C−III)
(D) Here, the slope dtdx=constant.
As the slope of displacement-time is positive constant, so the velocity will be uniform positive value.
(D−I)







