A body moving with uniform acceleration describes 10 metre in the 3rd sec and 12 metre in the 5th sec.
Find the distance traveled in (1) first 3 sec (2) 9th second of its motion.
Answers
Step-by-step explanation:
Answer :-
Distance travelled by the body :-
→ In first 3 sec is 27 m .
→ 9th second of it's motion is 16 m .
Explanation :-
Firstly, let's calculate the acceleration and initial velocity of the body.
For 3rd second :-
⇒ 10 = u + a/2[2 × 3 - 1]
⇒ 10 = u + 5a/2
⇒ 10 = u + 2.5a -----(1)
For 5th second :-
⇒ 12 = u + a/2[2 × 5 - 1]
⇒ 12 = u + 9a/2
⇒ 12 = u + 4.5a -----(2)
Subtracting eq.2 from eq.1 :-
⇒ 10 - 12 = u + 2.5a - u - 4.5a
⇒ - 2 = - 2a
⇒ a = 1 m/s²
Putting value of 'a' in eq.1 :-
⇒ 10 = u + 2.5(1)
⇒ u = 10 - 2.5
⇒ u = 7.5 m/s
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By using the 2nd equation of motion :-
s = ut + ½at²
⇒ s = 7.5(3) + ½ × 1 × (3)²
⇒ s = 22.5 + 4.5
⇒ s = 27 m
Now, from the equation of distance covered in the 'nth' second :-
sₙₜₕ = u + a/2(2n - 1)
⇒ s₉ₜₕ = 7.5 + 1/2[2 × 9 - 1]
⇒ s₉ₜₕ = 7.5 + 0.5[17]
⇒ s₉ₜₕ = 7.5 + 8.5
⇒ s₉ₜₕ = 16 m
Answer:
Answer :-
Distance travelled by the body :-
→ In first 3 sec is 27 m .
→ 9th second of it's motion is 16 m .
Explanation :-
Firstly, let's calculate the acceleration and initial velocity of the body.
For 3rd second :-
⇒ 10 = u + a/2[2 × 3 - 1]
⇒ 10 = u + 5a/2
⇒ 10 = u + 2.5a -----(1)
For 5th second :-
⇒ 12 = u + a/2[2 × 5 - 1]
⇒ 12 = u + 9a/2
⇒ 12 = u + 4.5a -----(2)
Subtracting eq.2 from eq.1 :-
⇒ 10 - 12 = u + 2.5a - u - 4.5a
⇒ - 2 = - 2a
⇒ a = 1 m/s²
Putting value of 'a' in eq.1 :-
⇒ 10 = u + 2.5(1)
⇒ u = 10 - 2.5
⇒ u = 7.5 m/s
________________________________
By using the 2nd equation of motion :-
s = ut + ½at²
⇒ s = 7.5(3) + ½ × 1 × (3)²
⇒ s = 22.5 + 4.5
⇒ s = 27 m
Now, from the equation of distance covered in the 'nth' second :-
sₙₜₕ = u + a/2(2n - 1)
⇒ s₉ₜₕ = 7.5 + 1/2[2 × 9 - 1]
⇒ s₉ₜₕ = 7.5 + 0.5[17]
⇒ s₉ₜₕ = 7.5 + 8.5
⇒ s₉ₜₕ = 16 m