Two particle A and B are moving in XY-pl...

Two particle A and B are moving in XY-plane. Their positions vary with time t according to relation
`x_(A)(t)=3t, x_(B)(t)=6`
`y_(A)(t)=t, y_(B)(t)=2+3t^(2)`
The distance between two particle at `t=1` is :

`sqrt(12)`

Text Solution

Verified by Experts

The correct Answer is:

At `t=1, x_A = 3, x_B = 6, y_A = 1 and y_B = 5`
so distance `= sqrt((x_B- x_A)^(2) + (y_B-y_A)^(2))`
`= sqrt((6-3)^(2) + (5-1)^(2))= sqrt(3^(2)+4^(2))= 5`

Topper's Solved these Questions

BASIC MATHEMATICS USED IN PHYSICS &VECTORS
ALLEN |Exercise DEFINITION & TYPES OF VECTOR|5 Videos
BASIC MATHEMATICS USED IN PHYSICS &VECTORS
ALLEN |Exercise ADDITON & SUBTRACTION, MULTIPLICATION & DIVISION OF A VECTOR BY A SCALAR|21 Videos
BASIC MATHEMATICS USED IN PHYSICS &VECTORS
ALLEN |Exercise TRIGONOMETRY|7 Videos
CENTRE OF MASS
ALLEN |Exercise EXERCISE-V B|19 Videos

Similar Questions

Explore conceptually related problems

A particle moves in the x-y plane. It x and y coordinates vary with time t according to equations x=t^(2)+2t and y=2t . Possible shape of path followed by the particle is

A particle moving in a straight line has its velocit varying with time according to relation v = t^(2) - 6t +8 (m//s) where t is in seconds. The CORRECT statement(s) about motion of this particle is/are:-

The position of a particle moving in space varies with time t according as :- x(t)=3 cosomegat y(t)=3sinomegat z(t)=3t-8 where omega is a constant. Minimum distance of particle from origin is :-

A particle moves in a straight line and its position x at time t is given by x^(2)=2+t . Its acceleration is given by :-

The coordinates of a particle moving in XY-plane very with time as x=4t^(2),y=2t . The locus of the particle is

The displacement of a particle varies with time according to the relation y= a sin omega t+b cos omega t ……………

A particle moves along X-axis in such a way that its coordinate X varies with time t according to the equation x = (2-5t +6t^(2))m . The initial velocity of the particle is

The displacement of a particle is given by x(t) = (4t ^(2) +8) meter. The instantaneous velocity of a particle at t = 2s is

The displacement (in metre) of a particle varies with time (in second) according to the equation y =- (2)/(3) t ^(2) + 16 t +2. How long does the particle take to come to rest ?

A particle moves along a straight line and its position as a function of time is given by x = t6(3) - 3t6(2) +3t +3 , then particle

ALLEN -BASIC MATHEMATICS USED IN PHYSICS &VECTORS -GEOMETRY

The equation of a curve is given as y=x^(2)+2-3x. The curve intersec...
Text Solution
|
Two particle A and B are moving in XY-plane. Their positions vary with...
Text Solution
|
A particle straight line passes through origin and a point whose absci...
Text Solution
|
The side of a square is increasing at the rate of 0.2 cm/s. The rate o...
Text Solution
|
Frequency f of a simple pendulum depends on its length l and accelerat...
Text Solution
|
The sum of the series 1+ (1)/(4) + (1)/(16) + (1)/(64) + ...........oo...
Text Solution
|
In the given figure, each box represents a function machine. A functio...
Text Solution
|

Two particle A and B are moving in XY-plane. Their positions vary with time t according to relation `x_(A)(t)=3t, x_(B)(t)=6` `y_(A)(t)=t, y_(B)(t)=2+3t^(2)` The distance between two particle at `t=1` is :

Text Solution

Topper's Solved these Questions

Similar Questions

ALLEN -BASIC MATHEMATICS USED IN PHYSICS &VECTORS -GEOMETRY

Two particle A and B are moving in XY-plane. Their positions vary with time t according to relation
`x_(A)(t)=3t, x_(B)(t)=6`
`y_(A)(t)=t, y_(B)(t)=2+3t^(2)`
The distance between two particle at `t=1` is :