Math, asked by induyadav2255, 2 months ago

A car increases its speed with uniform rate from 20 km/h to 50 km/h in 10 seconds, average speed of car is​

Answers

Answered by amitnrw
17

Given : A car increases its speed with uniform rate from 20 km/h to 50 km/h in 10 seconds,

To Find : average speed of car

Solution:

u = Initial velocity = 20 km/h

v = final velocity = 50 km/h

Speed increases uniformly hence

average speed of car = (u + v)/2

= ( 20 + 50)/2

= 35 km /h

Additional Info

acceleration = ( v- u ) / t

v -  u = 50 - 20  = 30 km /h  = 30 * 5/18  m/s

= 25/3  m/s

acceleration =  (25/3)/10 = 25/30

= 5/6  m/s²

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Answered by nirman95
14

Given:

A car increases its speed with uniform rate from 20 km/h to 50 km/h in 10 seconds.

To find:

Average Speed of car?

Calculation:

USE v_(avg) = (u+v)/2 directly ONLY IN MCQs, NOT IN SCHOOL/BOARD EXAMS !!

FOR SCHOOL EXAMS, follow this method:

  \rm v_{avg} =  \dfrac{displacement}{time}

  \rm  \implies \: v_{avg} =  \dfrac{s}{t}

  \rm  \implies \: v_{avg} =  \dfrac{ut +  \dfrac{1}{2}a {t}^{2}  }{t}

  \rm  \implies \: v_{avg} =  u +  \dfrac{1}{2}a t

  \rm  \implies \: v_{avg} =  \dfrac{2u + at}{2}

  \rm  \implies \: v_{avg} =  \dfrac{u + (u + at)}{2}

  \rm  \implies \: v_{avg} =  \dfrac{u + v}{2}

AFTER THIS DERIVATION, you can put the values:

  \rm  \implies \: v_{avg} =  \dfrac{20 + 50}{2}

  \rm  \implies \: v_{avg} =  \dfrac{70}{2}

  \rm  \implies \: v_{avg} =  35 \: km/hr

So, average velocity is 35 km/hr.

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