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I have the following probability density function (pdf):

$f(x)={0$ if $x<= 11$

$x-11$ if $11leq x leq 12$

$13-x$ if $12leq x leq 13 }$

My aim is to find the distribution function $F(x)$ where the integral from $-infty$ to $+infty$ of the pdf $f(x)$ equals one. I know I have to integrate the pdf over the various sub-intervals indicated above, however, I get something that is not correct. Could somebody please explain me step by step how to do it?
I apologize for my bad typing of the problem, I hope you can understand.
Thank you in advance

Since the value of the pdf before $11$ is $0$, $F(x)$ will also be $0$ before $11$. After $11$, we integrate pdf from $11$ to $12$ separately, and $12$ to $13$ separately as they have different pdfs.

From $11$ to $12$ ($11leq yleq 12$)

$$F(y) = int_{11}^{y}(x - 11)dx = frac{y^2}{2} - 11y + frac{121}{2} $$

For $12$ to $13$ ($12leq yleq 13$), we'll need the value of $F(12)$ as this will be added to the integral. So putting $y = 12$ in the above integral, we get $F(12) = 0.5$

Now for $12$ to $13$ ($12leq yleq 13$)

$$F(y) = 0.5 + int_{12}^{y}(13 - x)dx = 13y - frac{y^2}{2} - 83.5$$

After $13$, i.e. $ygeq 13$

$$F(y) = 1$$

as can be seen by putting $y = 13$ in the second equation.