Instantaneous Acceleration Given Equation for Velocity

Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
7 replies · 2K views
amandela
Messages
9
Reaction score
3
Thread moved from the technical forums to the schoolwork forums
This is from an old exam.

The velocity of a particle moving along a straight line is v = 4 + 0.5 t. What is the instantaneous acceleration at t=2?

The solution is supposedly 2 because a = dv/dt = t. But I thought dv/dt here would be 0.5. What am I missing?

Thanks.
 
on Phys.org
Welcome to PF.

Where are you seeing a solution of 2? dv/dt for that equation is indeed 0.5 if you've written the equation correctly.
 
Reply
  • Like
Likes   Reactions: amandela
berkeman said:
Welcome to PF.

Where are you seeing a solution of 2? dv/dt for that equation is indeed 0.5 if you've written the equation correctly.
Thank you. I think I lost an exponent!
 
Orodruin said:
Should this be ##v= 4 + 0.5 t^2##??
Yes, I went back and checked again b/c the displacement was wrong, too, and I missed the exponent. Thank you!
 
Reply
  • Like
Likes   Reactions: WWGD and berkeman
amandela said:
This is from an old exam.

The velocity of a particle moving along a straight line is v = 4 + 0.5 t^2
What's your opinion about the dimensionality of that equation? The lefthand side is a velocity and the righthand side is a number plus a time squared. Is that valid?
 
PeroK said:
What's your opinion about the dimensionality of that equation? The lefthand side is a velocity and the righthand side is a number plus a time squared. Is that valid?
In my opinion the equation is only valid for a set of units where the appropriate conversion constants all turn out to be equal to one.

There should be units on the ##4## and units on the ##0.5##. The computed result would then have units for the ##v##. Also units for the given value of ##t = 2##. The first derivative of that would then have units for the acceleration.
 
Reply
  • Like
Likes   Reactions: PeroK
PeroK said:
What's your opinion about the dimensionality of that equation? The lefthand side is a velocity and the righthand side is a number plus a time squared. Is that valid?
Lower level textbooks often introduce dimensionless quantities such as ”velocity ##v## m/s or simply do not use units at all.
 
Reply
  • Like
Likes   Reactions: amandela