If you draw the relationship between ax and t, what is the expected shape of the graph?
It would help if you would proofread your work before you post it.
Have NO idea about the values of ax and t.
If you draw the relationship between ax and t, what is the expected shape of the graph?
Displacement
x (m)
0.5
1.0
1.5
2.0
3.0
4.0
5.0
6.0
8.0
10.0
--------------
t(s)
1.71
2.42
2.96
3.42
4.19
4.84
5.41
5.93
6.84
7.65
------------
ax= 0.3418
----what is the answer?
College of Sciences
Department of Applied Physics and Astronomy
LABORATORY EXPERIMENTS IN
PHYSICS (1)
Uniformly Accelerated Motion
STUDENT LAB REPORT
does anyone have the answers for this report?
can anyone help?
To determine the expected shape of the graph for the relationship between ax and t, we need to consider the equation or expression relating these variables.
If the equation is in the form of ax = f(t), where f(t) can be any function of t, then the graph could take on various shapes depending on the specific equation or function.
However, if we have a simple linear equation that relates ax and t, such as ax = bt (where a and b are constants), then the graph would be a straight line. The slope of the line would be b, and it would be proportional to t. Therefore, as t increases, ax would also increase, potentially at a constant rate.
If we have a quadratic relationship, such as ax = bt^2 (where a and b are constants), then the graph would be a parabola. The shape of the parabola would depend on the sign of the coefficient a. If a is positive, the parabola would open upward, and if a is negative, the parabola would open downward. The vertex of the parabola would indicate the minimum or maximum value, depending on the sign of a.
In summary, the expected shape of the graph would vary depending on the specific equation or expression relating ax and t. It could be a straight line, a parabola, or another curve depending on the nature of the relationship expressed by the equation.