godssent2 Posted May 14, 2014 Posted May 14, 2014 Im struggeling on this question. please help if possible, would love an explanation! 1. During a sprint start, a 69.8 kg athlete exerts constant horizontal and vertical forces of 955 N and 987 N respectively, against the starting blocks. This resulted in a change in horizontal velocity of 7.94m.s-1. Calculate the time over which the horizontal force was applied to the start blocks.
godssent2 Posted May 14, 2014 Author Posted May 14, 2014 2 Helpfull replies would be appreciated... 1
Theodore Bagwell Posted May 14, 2014 Posted May 14, 2014 (edited) Im struggeling on this question. please help if possible, would love an explanation! 1. During a sprint start, a 69.8 kg athlete exerts constant horizontal and vertical forces of 955 N and 987 N respectively, against the starting blocks. This resulted in a change in horizontal velocity of 7.94m.s-1. Calculate the time over which the horizontal force was applied to the start blocks. Hmm, so if i'm right the athlete accelerates at the first starting position with given forces? This is what i would say: F(total) = F(horizontal) + F(vertical) = 987 + 955 = 1942N A = F/m = 1942 / 96,8 = 20m.s-2 So his acceleration is 20m.s-2 Now i stuck as theres no distance given (so it's not possible to calculate the time). Maybe it helped, maybe not Edited May 14, 2014 by Matrix
Dard Posted May 14, 2014 Posted May 14, 2014 Hmm, so if i'm right the athlete accelerates at the first starting position with given forces? This is what i would say: F(total) = F(horizontal) + F(vertical) = 987 + 955 = 1942N A = F/m = 1942 / 96,8 = 20m.s-2 So his acceleration is 20m.s-2 Now i stuck as theres no distance given (so it's not possible to calculate the time). Maybe it helped, maybe not Nice Japanese skills, I have no idea what the heck you're talking about xD 2
tes1234 Posted May 14, 2014 Posted May 14, 2014 By conservation of linear momentum; Initial momentum = 0, final momentum = 69.8 x 7.94 kgms^-1. Impulse due to horizontal force causes change in (horizontal) linear momentum - impulse = force x time, so we have 955 * t = dp. Solve for t.
