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Answer:
The particle changes its direction 2 times within the time -3<t<3
Step-by-step explanation:
The particle is moving only in a single dimension (x-axis), and whenever the particle changes its direction it also means that it's velocity while changing the direction will be zero.
Hence,
v(t) = 0
but since we're not concerned with the actual values of t when v(t)=0, we'll only consider how many times does the particle changes its direction.
for that we'll simply plot the curve using half-steps from -3 to 3.
t, v(t)
-3, 115
-2.5, 23.9375
-2, -16
-1.5, -25.0625
-1, -19
-0.5, -9.0625
0, -2
0.5, -0.0625
1, -1
1.5, 1.9375
2, 20
2.5, 68.9375
3, 169
What we need to check is at what points does the sign of v(t) values change (because only between those points will v(t) cross the x-axis, hence it's value would've crossed 0)
so there are two points!
between the intervals t = [-2.5,2] and [1,1.5]
so there are two points where the particle changes its directions and those points lie somewhere between these two aforementioned intervals.
The number of times where the particle changes direction as t increases from −3 to 3 is b.and this can be determined by plotting the table of v(t) for different values of 't'.
Given :
[tex]\rm v(t) = 3t^4-11t^2+9t-2[/tex] for [tex]\rm -3 \leq t \leq 3[/tex]
A particle moves in a single dimension and while changing the direction the velocity of the particle is zero.
Now, plot the table between [tex]\rm -3 \leq t \leq 3[/tex] to determine how many times the direction of the particle changes.
t v(t)
-3 115
-2.5 23.9375
-2 -16
-1.5 -25.0625
-1 -19
-0.5 -9.0625
0 -2
0.5 -0.0625
1 -1
1.5 1.9375
2 20
2.5 68.9375
3 169
So, where the sign of v(t) changes the direction of the particle also changes.
Therefore, the number of times where the particle change direction as t increases from −3 to 3 is b.
For more information, refer to the link given below:
https://brainly.com/question/19770987
