A body travels for $15\, sec$ starting from rest with constant acceleration. If it travels distances ${S_1},\;{S_2}$ and ${S_3}$ in the first five seconds, second five seconds and next five seconds respectively the relation between ${S_1},\;{S_2}$ and ${S_3}$ is
A body travels for $15\, sec$ starting from rest with constant acceleration. If it travels distances ${S_1},\;{S_2}$ and ${S_3}$ in the first five seconds, second five seconds and next five seconds respectively the relation between ${S_1},\;{S_2}$ and ${S_3}$ is
${S_1} = {S_2} = {S_3}$
$5{S_1} = 3{S_2} = {S_3}$
${S_1} = \frac{1}{3}{S_2} = \frac{1}{5}{S_3}$
${S_1} = \frac{1}{5}{S_2} = \frac{1}{3}{S_3}$
A body travels for $15\, sec$ starting from rest with constant acceleration. If it travels distances ${S_1},\;{S_2}$ and ${S_3}$ in the first five seconds, second five seconds and next five seconds respectively the relation between ${S_1},\;{S_2}$ and ${S_3}$ is
If the body starts from rest and moves with constant acceleration then the ratio of distances in consecutive equal time interval ${S_1}:{S_2}:{S_3} = 1:3:5$
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