Respuesta :
Answer:
a) The system of equation representing the situation is [tex]20x+15y\leq 100[/tex]
b) Sean can buy 2 pair of pants and 4 shirts with the money he needs to spend.
Step-by-step explanation:
Given:
Total money need to spend on clothing = $100
Cost of each pair of pant = $20
Cost of each shirt = $15
Let the number pair of pants be 'x'.
Let number of shirts be 'y'.
Solving for part a.
We need to find the system of equation representing the situation.
Now we know that Total Money spent is less than or equal to sum of Cost of each pant multiplied by number of pair of pants and Cost of each shirt multiplied by number of shirts.
Framing in equation form we get;
[tex]20x+15y\leq 100[/tex]
Hence, The system of equation representing the situation is [tex]20x+15y\leq 100[/tex]
Now Solving for part b.
We need to find whether he can buy 2 pairs of pants and 4 shirts.
Which means [tex]x=2;y=4\\[/tex]
Substituting the values we get;
[tex]20x+15y\leq 100\\\\20\times2+15\times4\leq 100\\\\40+60\leq 100\\\\100\leq 100[/tex]
Since the amount required to buy 2 pants and 4 shirts is equal to amount of money he has.
Hence Sean can buy 2 pair of pants and 4 shirts with the money he needs to spend.
Answer:
a) 20x+15y=100
b) Yes, Sean can purchase 2 pairs of pants and 4 shirts
Step-by-step explanation:
Hope this helps
