2 Answers

Ivallesp · Answer 1 · 2020-03-16T07:13:11+0000

Answer:

v = .992 c.

Step-by-step explanation:

In relativistic mechanics , momentum

$mv=\frac{m_0v}{\sqrt{1-(v^2)/(c^2) } }$

c is velocity of light , m₀ is rest mass and v is velocity of the body..

Given

(mv)/(m_0v) = 8.3

$\sqrt{1 -(v^2)/(c^2) } = (1)/(8.3)$

Solving for v

v = .992 c.

Nathancahill · Answer 2 · 2020-03-21T18:02:30+0000

Answer:

Speed of the object, v = 0.99 c

Step-by-step explanation:

It is given that, an object has a relativistic momentum that is 8.30 times greater than its classical momentum.

The relativistic momentum is given by,
$p=\frac{m_ov}{\sqrt{1-(v^2)/(c^2)}}$

Classical momentum, p' = mv

According to the given condition,

p = 8.3 p'

$\frac{m_ov}{\sqrt{1-(v^2)/(c^2)}}=8.3* m_ov$

$\sqrt{1-(v^2)/(c^2)}=(1)/(8.3)$

1-(v^2)/(c^2)=0.01451

(v^2)/(c^2)=0.985

v=0.99c , c is the speed of light

So, the speed of the object is 0.99 c. Hence, this is the required solution.

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