Respuesta :
Answer:
1 point baskets = 19
2 point baskets = 22
3 point baskets = 5
Step-by-step explanation:
Given:
Number of points scored (P) = 78
Number of 1 point baskets = 19
Number of 2 and 3 points basket = 27
Let the number of 2 point baskets be 'x' and 3 point basket be 'y'.
Therefore,
[tex]x+ y=27\\\\y=27-x[/tex]
Now, points scored per 2 point basket = 2
So, points scored for 'x' baskets = [tex]2x[/tex]
Also, points scored for 'y' baskets = [tex]3y=3(27-x)=81-3x[/tex]
Now, total points scored is equal to the sum of 1 point baskets, 2 point baskets and 3 point baskets. Therefore,
[tex]P=19+2x+81-3x\\\\78=100-x\\\\x=100-78\\\\x=22[/tex]
Therefore, number of 2 point baskets = 22
Now, number of 3 point baskets = 27 - 22 = 5
So, there were 19 one point baskets, 22 two point baskets and 5 three point baskets.
Answer:
The team made 22 2-point shots and 5 3-point shots.
Step-by-step explanation:
This question can be solved by a system of equations.
I am going to say that:
x is the number of 2 point shots.
y is the number of 3 point shots.
The remaining 27 baskets we're 2 point and 3 point shots
There were 27 shots, so
[tex]x + y = 27[/tex]
Allison's team scored 78 points in total. Nineteen of the baskets counted 1 point each.
So all the remaining shots counted for 78 - 19 = 59 points. So
[tex]2x + 3y = 59[/tex]
From the other equation, we have that:
[tex]y = 27 - x[/tex]
So
[tex]2x + 3(27 - x) = 59[/tex]
[tex]2x + 81 - 3x = 59[/tex]
[tex]x = 22[/tex]
[tex]y = 27 - x = 27 - 22 = 5[/tex]
The team made 22 2-point shots and 5 3-point shots.
