Question

What is the instantaneous velocity of an object moving in accordance to `f(t)= (sqrt(t+2),t+4)` at `t=1`?

Answer 1

`sqrt 2`

Explanation:

Take the derivative of `sqrt (t+2)`. You should get:

`1/(2sqrt(t+2))`

Plug in 1 to get `1/2sqrt(2)`.

Now take the derivative of `t+4`. You should get 1 so plugging in 1 will get you 1.

Now that you know that it has a velocity of `1/2sqrt(2)`. in the x direction and 1 in the y direction, you need to find the resulting velocity from that. Use Pythagorean theorem:

`a^2+b^2=c^2`

`(1/(2sqrt2))^2+1^2=c^2`

`1/(4*2)+1=c^2`

`c=sqrt(9/8)`

Answer 2

Instantaneous velocity is given by the vector:

`vec(v) = << sqrt(3)/6,1 >>`, or, `sqrt(3)/6 hat(i)+hat(j)`, or, `( (sqrt(3)/6),(1) )`

Explanation:

We have:

`f(t) = ( x(t), y(t) )` where `x(t)=sqrt(t+1)`, `y(t)=t+4`

Then;

`dx/dt = 1/2(t+2)^(-1/2) = 1/(2sqrt(t+2))`
`dy/dt = 1`

So, when `t=1`:

`dx/dt = 1/(2sqrt(1+2)) = 1/(2sqrt(3)) = sqrt(3)/6`
`dy/dt = 1`

And so the instantaneous velocity is given by the vector:

`vec(v) = << sqrt(3)/6,1 >>`, or, `sqrt(3)/6 hat(i)+hat(j)`, or, `( (sqrt(3)/6),(1) )`

If we want the instantaneous speed , it is given by:

`v = || vec(v) ||`
`\ \ \= sqrt( 3/36 + 1 )`
`\ \ \= sqrt( 13/12)`
`\ \ \~~ 1.04083`