Respuesta :
Answer:
[tex]a=-.78m/s^2[/tex]
Explanation:
Δ[tex]v=at[/tex]
- Δ[tex]v[/tex] is the difference in velocity before and after a given time.
- [tex]a[/tex] is the acceleration of the object during this time.
- [tex]t[/tex] is time
[tex](v_f-v_i)=at[/tex] is another way to write this equation.
- The Δ symbol represents "the difference between the initial and final values of a magnitude or vector", so Δ[tex]v=(v_f-v_i)[/tex]
[tex]v_f-v_i=at\\\frac{at}{t}=\frac{v_f-v_i}{t}\\a=\frac{v_f-v_i}{t}[/tex]
- I rearranged this equation to solve for [tex]a[/tex], but this is a step that you don't need to take, it's just good to get in the habit of doing this.
- Plug in the given values. Note that our final velocity is [tex]0[/tex], because the car travels until at rest.
[tex]a=\frac{v_f-v_i}{t}\\a=\frac{(0)-[(17.1\frac{miles}{hour} )(\frac{hour}{3600s})(\frac{1609.34m}{mile})]}{9.7s}[/tex]
- Our initial velocity is in mph, something not in standard units, so if not changed, you will get an incorrect answer. What you need to do is cancel out the units your prior value had using division and multiplication, and at the same time multiply and divide the correct numbers and units into your equation. Or look up a converter.
[tex]a=\frac{(0)-[(17.1\frac{miles}{hour} )(\frac{hour}{3600s})(\frac{1609.34m}{mile})]}{9.7s}\\a=\frac{0m/s-7.6m/s}{9.7s} \\a=\frac{-7.6m/s}{9.7s}[/tex]
- if you converted correctly, your answer for [tex]v_f[/tex] will be ≅ [tex]7.6m/s[/tex].
- Now divide. Notice that the units for acceleration are [tex]m/s^2[/tex] or meters per second, per second.
[tex]a=\frac{-7.6m/s}{9.7s}\\a=-.78m/s^2[/tex]
- Our final answer is negative because the car is slowing down. Do not square this answer as the square symbol only applies to the units, not the magnitude.
Answer: a= -0.79 m/s²
Explanation:solution attached:
First convert 17.1 mi/h to m/s
Conversion factor:
1 mi = 1609.344m
1hr = 3600s
17.1 mi/h x 1609.344 / 1 mi x 1h/ 3600s
= 7.64 m/s
Solve for acceleration:
a= vf - vi / t
= 0 m/s - 7.64 m/s / 9.7 s
= - 0.79 m/s²
The car is decelerating since the result is negative.
