Respuesta :
1. You can order pizza with: 1, 2, 3, 4 toppings for $10. Let's count:
1 topping from 18: 18 ways;
2 toppings: [tex]C(18,2)= \dfrac{18!}{2!(18-2)!} =\dfrac{18!}{2!(16)!}=\dfrac{17\cdot 18}{2}=153[/tex] ways of ordering;
3 toppings:[tex]C(18,3)= \dfrac{18!}{3!(18-3)!} =\dfrac{18!}{3!(15)!}=\dfrac{16\cdot 17\cdot 18}{2\cdot 3}=816[/tex] ways of ordering;
4 toppings:[tex]C(18,4)= \dfrac{18!}{4!(18-4)!} =\dfrac{18!}{4!(14)!}=\dfrac{15\cdot 16\cdot 17\cdot 18}{2\cdot 3\cdot 4}=3060[/tex] ways of ordering.
Totally, 3060+816+153+18=4047 ways of ordering pizza with topping. Since you use here C(n,r) this is combinations problem.
If there are no restriction on the number of toppings you could choose, you could order pizza with 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18 toppings and totally it will be
[tex]C(18,0)+C(18,1)+C(18,2)+\dots+C(18,17)+C(18,18)=2^{18}[/tex] different ways of ordering.
1 topping from 18: 18 ways;
2 toppings: [tex]C(18,2)= \dfrac{18!}{2!(18-2)!} =\dfrac{18!}{2!(16)!}=\dfrac{17\cdot 18}{2}=153[/tex] ways of ordering;
3 toppings:[tex]C(18,3)= \dfrac{18!}{3!(18-3)!} =\dfrac{18!}{3!(15)!}=\dfrac{16\cdot 17\cdot 18}{2\cdot 3}=816[/tex] ways of ordering;
4 toppings:[tex]C(18,4)= \dfrac{18!}{4!(18-4)!} =\dfrac{18!}{4!(14)!}=\dfrac{15\cdot 16\cdot 17\cdot 18}{2\cdot 3\cdot 4}=3060[/tex] ways of ordering.
Totally, 3060+816+153+18=4047 ways of ordering pizza with topping. Since you use here C(n,r) this is combinations problem.
If there are no restriction on the number of toppings you could choose, you could order pizza with 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18 toppings and totally it will be
[tex]C(18,0)+C(18,1)+C(18,2)+\dots+C(18,17)+C(18,18)=2^{18}[/tex] different ways of ordering.
There are number of ways of ordering pizza with topping is 4047 number of ways without restriction is 262144 number of ways.
You can order pizza with: 1, 2, 3, 4 toppings for $10.
What is the formula for the combination?
[tex]C(n,r)=\frac{n!}{r!(n-r)!}[/tex]
For 1 topping from (18: 18)ways
For 2 toppings
[tex](18,2)=\frac{18!}{(18-2)!2!}\\ =\frac{18!}{2! 16!} \\=\frac{17(18)(16!)}{2(16!}\\ =\frac{18\times17}{2} \\=153[/tex]
153 no of ways of ordering;
For 3 toppings:
[tex]C(18,3)=\frac{18!}{(18-3)!3!}\\ =\frac{18!}{3!15!} \\=\frac{16(17)(18)}{2(3)}\\=816[/tex]
816 number of ways of ordering
By using the calculator for find answer.
4 toppings:
[tex]C(18,4)=\frac{18!}{(18-4)!(4!)} \\\\=\frac{18!}{14!\times4!} \\=3060[/tex]
3060 number of ways of ordering.
Total number of ways is ,
3060+816+153+18=4047
4047 number of ways of ordering pizza with topping.
Since you use here C(n,r) this is combinations problem.
If there are no restriction on the number of toppings
we choose,order pizza with 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18 toppings and
totally it will be
[tex]C(18,1)+18(18,2)........+(18,10)=2^{18}[/tex]
[tex]2^{18}=262144[/tex]
Therefore,when there is no restriction on the toppings there are 262144 number of ways of ordering.
To learn more about the combination visit:
https://brainly.com/question/25821700
