Physics, asked by shrikar007, 23 days ago

a=4 - 2t Initial velocity at t=0,u=5, find distance travelled till 12sec? ​

Answers

Answered by amitnrw
1

Given :  a = 4 – 2t Initial velocity at t=0,u=5,

To find :  

distance travelled till 12sec

Solution:

a = 4 – 2t

a = dv/dt

=> dv/dt = 4 - 2t

=> dv = (4 - 2t)dt

integrating both sides

=> v = 4t  - t² +  c

at t=0,u=5

=> 5 = 0 - 0 + c

=> c = 5

Hence v  = 4t  - t² +  5

v = ds/dt

=> ds = (4t  - t² +  5) dt

v = -t² + 4t + 5

=> v = -t² -t + 5t + 5

=> v = -t(t + 1) + 5(t + 1)

=> v = (t + 1)( 5 - t)

v > 0  if     -1 < t < 5

v < 0  if   t < - 1  or  t  > 5

Hence from 0 to 12 secs

0 to 5 secs velocity is in +ve direction

and from 5 to 12 sec velocity is in -ve direction

distance covered in always + ve

so need to split the distance covered in interval from 0 to 5 and 5 to 12.

Hence  

ds = (4t  - t² +  5) dt

Integrating both sides

s=| \int\limits^5_0 { (4t  - t^2 +  5} \, dt |+ | \int\limits^{12}_5 { (4t  - t^2 +  5} \, dt |

s=| \left    2t^2  - \frac{t^3}{3}  +  5t  \right|_0^5 |+ | \left    2t^2  - \frac{t^3}{3}  +  5t  \right|_5^{12} |

s =  | (50 - 125/3 + 25 - 0) | + | 288 - 576 + 60 - (50 - 125/3 + 25 - 0) |

=> s = |  100/3 |  + |  -228 - 100/3|

=>s = 100/3 + 228 + 100/3

=> s = 228 + 200/3

=> s = 228 + 66.67

=> s = 294.67

distance travelled till 12sec = 294.67 m

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Answered by jaswasri2006
1

 \huge \tt294.67 \: cm

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