Difference between Distance and Displacement
Example 1: A body travels in a semicircular path of radius 10 m starting its motion from point ‘A’ to point ‘B’. Calculate the distance and displacement.
Total distance travelled by body, S = ?
Given, π = 3.14, R = 10 mS = πR
= 3.14 × 10 m
= 31.4 m
Total displacement of body, D = ?
Given, R = 10 m
D = 2×R = 2×10 m = 20 m
Example 2: A body travels 4 km towards the North, then turns to his right and travels another 4 km before coming to rest. Calculate (i) the total distance traveled and (ii) the total displacement.
Total distance travelled = OA + AB
= 4 km + 4 km = 8 km
Total displacement = OB
Non-uniform Motion
Two types of non-uniform-motion
Speed (v) = Distance Travelled/Time Taken = s/t
Average speed = Total distance travelled/Total time taken
Conversion Factor: Change from km/hr to m/s = 1000m/(60×60)s = 5/18 m/s
Example: What will be the speed of body in m/s and km/hr if it travels 40 kms in 5 hrs ?
Distance (s) = 40 km
Time (t) = 5 hrs.
Speed (in km/hr) = Total distance/Total time = 40/5 = 8 km/hr
40 km = 40 × 1000 m = 40,000 m
5 hrs = 5 × 60 × 60 sec.
Speed (in m/s) = (40 × 1000)/(5×60 ×60) = 80/36 = 2.22 m/s
Velocity = Displacement/Time
Average velocity = Total displacement/Total time
Avg. Velocity (vavg) = (Initial velocity + Final velocity)/2 = (u+v)/2, where, u = initial velocity, v = final velocity
Example 1: During first half of a journey by a body it travel with a speed of 40 km/hr and in the next half it travels with a speed of 20 km/hr. Calculate the average speed of the whole journey.
Speed during first half (v1) = 40 km/hr
Speed during second half (v 2 ) = 20 km/hr
Average speed = (v1+v2)/2 = (40+60)/2 = 60/2 = 30
Average speed by an object (body) = 30 km/hr.
Example 2: A car travels 20 km in first hour, 40 km in second hour and 30 km in third hour.
Calculate the average speed of the train.
Speed in Ist hour = 20 km/hr
Distance travelled during 1st hr = 1×20= 20 km
Speed in 2nd hour = 40 km/hr
Distance travelled during 2nd hr = 1×40= 40 km
Speed in 3rd hour = 30 km/hr
Distance travelled during 3rd hr = 1×30= 30 km
Average speed = Total distance travelled/Total time taken
= (20+40+30)/3 = 90/3 = 30 km/hr
Acceleration (a) = Change in velocity/Time = (v-u)/t
where, v = final velocity, u = initial velocity
Retardation/Deaceleration
Deaceleration (a') = Change in velocity/Time = (v-u)/t
Here, v < u, ‘a’ = negative (-ve).
Example 1: A car speed increases from 40 km/hr to 60 km/hr in 5 sec. Calculate the acceleration of car.
u = 40km/hr = (40×5)/18 = 100/9 = 11.11 m/s
v = 60 km/hr = (60×5)/18 = 150/9 = 16.66 m/s
t = 5 sec
a = (v-u)/t = (16.66 - 11.11)/5
= 5.55/5 = 1.11 ms-2
Example 2: A car travelling with a speed of 20 km/hr comes into rest in 0.5 hrs. What will be the value of its retardation?
v = 0 km/hr
u = 20 km/hr
t = 0.5 hrs
Retardation, a’ = (v-u)/t = (0-20)/0.5
= -200/5 = -40 km hr-2
Velocity-Time Graph (v/t graph)
Note: The area enclosed between any two time intervals is ‘t2 - t1’ in v/t graph will represent the total displacement by that body.
Total distance travelled by body between t2 and t1, time intervals
= Area of ∆ABC + Area of rectangle ACDB
= ½ × (v2 – v1)×(t2 - t1) + v1× (t2 - t1)
Example: From the information given in s/t graph, which of the following body ‘A’ or ‘B’ will be more faster?
vA > vB
First Equation: v = u + at
Final velocity = Initial velocity + Acceleration × Time
Graphical Derivation
Suppose a body has initial velocity ‘u’ (i.e., velocity at time t = 0 sec.) at point ‘A’ and this velocity changes to ‘v’ at point ‘B’ in ‘t’ secs. i.e., final velocity will be ‘v’.
For such a body there will be an acceleration.
a = Change in velocity/Change in Time
⇒ a = (OB - OA)/(OC-0) = (v-u)/(t-0)
⇒ a = (v-u)/t
⇒ v = u + at
Second Equation: s = ut + ½ at2
Distance travelled by object = Area of OABC (trapezium)
= Area of OADC (rectangle) + Area of ∆ABD
= OA × AD + ½ × AD × BD
= u × t + ½ × t × (v – u)
= ut + ½ × t × at
⇒ s = ut + ½ at2 (∵a = (v-u)/t)
Third Equation: v2 = u2 + 2as
s = Area of trapezium OABC
⇒ v2 = u2 + 2as
Example 1: A car starting from rest moves with uniform acceleration of 0.1 ms-2 for 4 mins. Find the speed and distance travelled.
u = 0 ms-1 (∵ car is at rest)
a = 0.1 ms-2
t = 4 × 60 = 240 sec.
v = ?
From, v = u + at
v = 0 + (0.1 × 240)
⇒ v = 24 ms-1
Example 2: The brakes applied to a car produces deceleration of 6 ms -2 in opposite direction to the motion. If car requires 2 sec. to stop after application of brakes, calculate distance travelled by the car during this time.
Deceleration, a = − 6 ms-2
Time, t = 2 sec.
Distance, s = ?
Final velocity, v = 0 ms-1 (∵ car comes to rest)
Now, v = u + at
Or u = v – at
Or u = 0 – (-6×2) = 12 ms-1
And, s = ut + ½at2
= 12 × 2 + ½ (-6 × 22)
= 24 – 12 = 12 m
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1. What is motion? |
2. What are the different types of motion? |
3. What is the difference between distance and displacement? |
4. What is the difference between speed and velocity? |
5. How is acceleration related to motion? |
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