I want my graph to be continuous

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Mahmoud Chawki
Mahmoud Chawki on 9 Aug 2021
Commented: Rik on 9 Aug 2021
i want the graph to be continous. However, it is breaking form point 7 to 8 (t=7 to t=8).
as you can see from the function, at first it is a polynomial and after that it is linear, it is not taking 7 as a common point.
How can i fix that ??

Accepted Answer

Rik on 9 Aug 2021
You can also let Matlab do the heavy lifting by creating an anonymous function and using fplot:
fun=@(t) 0 + ...
(t<=7).*(0.5*a.*(t.^2)) + ...
fplot(fun,[0 30])
However, if you want to make the transition smooth, you will have to adjust a or v:
[0.5*a.*(t.^2) v.*t]
ans = 1×2
205.8000 411.6000
To make those equal for some value of t, this relation must hold:
If you want t=7, that means
7=2v/a ==> v=7a/2 ==> v=29.4
Now lets plot that one instead:
fun=@(t) 0 + ...
(t<=7).*(0.5*a.*(t.^2)) + ...
fplot(fun,[0 30])

More Answers (2)

Wan Ji
Wan Ji on 9 Aug 2021
It may work if you do by following Scott MacKenzie's advice or maybe you can do like this
t = [0:1:6, 6.01:0.01:6.99, 7:1:30];
This would make your curve more smooth then.
Wan Ji
Wan Ji on 9 Aug 2021
When t = 7, y encounters a gap. So a possible way is just to calculate them both and then to compare them.
a = 8.4; v = 58.8; t=0:0.1:30;
x1 = 0.5*a*t.^2; x2 = v*t;
q = x1<x2;
x = x1.*q + x2.*~q;
quite easy to find that the intersection point is 14.2, as mentioned by @Scott MacKenzie.

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Scott MacKenzie
Scott MacKenzie on 9 Aug 2021
You need to determine the point where the two functions intersect and then use that point in line 6 as the transition between the two curves. That point is t = 14, which (luckily) happens to be an integer. So, change 7 to 14 in line 6 and you're good to go:
Rik on 9 Aug 2021
@Bjorn True, in which case v would have to be set at a*t.

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