Answer:
[tex] 5C1 (9C3) (5C3)[/tex]
And replacing we got:
[tex] \frac{5!}{1! 4!} (\frac{9!}{3! (9-3)!}) (\frac{5!}{3! (5-3)!}) = 5*84*10=4200[/tex]
So then we have a total of 4200 possibilities in order to have a veggle wrap
Step-by-step explanation:
For this case we can use the combinatory formula given by:
[tex] nCx= \frac{n!}{x! (n-x)!}[/tex]
And for this case we have a total of 9 vegatables and 5 condiments and 5 types of tortilla. Then the total number of possibilities are:
[tex] 5C1 (9C3) (5C3)[/tex]
And replacing we got:
[tex] \frac{5!}{1! 4!} (\frac{9!}{3! (9-3)!}) (\frac{5!}{3! (5-3)!}) = 5*84*10=4200[/tex]
So then we have a total of 4200 possibilities in order to have a veggle wrap
