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Corrections:Part d) I calculated the answer right, but the integral should have been written from 0 to 90, not 20 to 80.
What was the answer u got from p to 90 on part d
It's still 62.164. I had done it correctly on the calculator, but I just wrote 20 to 80 on the paper.
Wouldn’t the distance between t=20 and t=80 on part c be the integral of the absolute value of the velocity. Because solely the integral of velocity is displacement. The total distance traveled is the absolute value of the integral of velocity
The distance between two locations is the displacement. They didn't ask for the distance traveled between those two times.
@@AllenTsaoSTEMCoach what happens if x(80)
@@JashXD Then the distance between them would be the absolute value of the displacement.
I ran out of time so I had to do part B of this question without a calculator 😢
On part d is said 0 to 90 not 20 to 80 but the setup is right
Oh yeah I typed in 0 to 90 in the calculator but I wrote it out wrong.
For part c, I did the Integral from 20-80 + p(20), minus the integral from 0 to 20 & still got the same answer. Will I get full credit for that one?
Yeah that would be fine.
Good good😭only c wrong
Corrections:
Part d) I calculated the answer right, but the integral should have been written from 0 to 90, not 20 to 80.
What was the answer u got from p to 90 on part d
It's still 62.164. I had done it correctly on the calculator, but I just wrote 20 to 80 on the paper.
Wouldn’t the distance between t=20 and t=80 on part c be the integral of the absolute value of the velocity. Because solely the integral of velocity is displacement. The total distance traveled is the absolute value of the integral of velocity
The distance between two locations is the displacement. They didn't ask for the distance traveled between those two times.
@@AllenTsaoSTEMCoach what happens if x(80)
@@JashXD Then the distance between them would be the absolute value of the displacement.
I ran out of time so I had to do part B of this question without a calculator 😢
On part d is said 0 to 90 not 20 to 80 but the setup is right
Oh yeah I typed in 0 to 90 in the calculator but I wrote it out wrong.
For part c, I did the Integral from 20-80 + p(20), minus the integral from 0 to 20 & still got the same answer. Will I get full credit for that one?
Yeah that would be fine.
Good good😭only c wrong