362302 A body moving with uniform acceleration \({6 {~m} / {s}^{2}}\) starts from rest. The distance covered by it in \({4^{\text {th }}}\) second will be

362303 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362304 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362305 The velocity of a body depends on time according to the equation \(v = 20 + 0.1{t^2}\). The body is undergoing

362302 A body moving with uniform acceleration \({6 {~m} / {s}^{2}}\) starts from rest. The distance covered by it in \({4^{\text {th }}}\) second will be

362303 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362304 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362305 The velocity of a body depends on time according to the equation \(v = 20 + 0.1{t^2}\). The body is undergoing

362302 A body moving with uniform acceleration \({6 {~m} / {s}^{2}}\) starts from rest. The distance covered by it in \({4^{\text {th }}}\) second will be

362303 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362304 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362305 The velocity of a body depends on time according to the equation \(v = 20 + 0.1{t^2}\). The body is undergoing

362302 A body moving with uniform acceleration \({6 {~m} / {s}^{2}}\) starts from rest. The distance covered by it in \({4^{\text {th }}}\) second will be

362303 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362304 A body \(A\) starts from rest with an acceleration \({a_1}\). After 2 seconds, another body \(B\) starts from rest with an acceleration \({a_2}\). If they travel equal distance in the \({5^{th}}\) second, after the start of \(A\), then the ratio \({a_1}:{a_2}\) is equal to:

362305 The velocity of a body depends on time according to the equation \(v = 20 + 0.1{t^2}\). The body is undergoing