4a)
I'm going to use the Substitution method
c = 160 + 67t
55 + 82t = 160 + 67t .... replace c with 55+82t; solve for t
55 + 82t - 55 = 160 + 67t - 55
82t = 67t + 105
82t - 67t = 67t + 105 - 67t
15t = 105
15t/15 = 105/15
t = 7
Use t = 7 to find that
c = 160 + 67t
c = 160 + 67*7
c = 629
You can use the other equation as well to get the same answer for c.
It takes 7 months for the cost to be the same. That cost is $629
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4b)
I'm going to use the Elimination method
Subtract the equations to get
x+y = 20
x-4y = -15
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0x+5y = 35
If 5y = 35, then y = 7 after we divide both sides by 5
Plug y = 7 into the first equation and solve for x
x+y = 20
x+7 = 20
x+7-7 = 20-7
x = 13
So x = 13 and y = 7 are the solutions
Max exercises 13 hours a week while Sasha exercises 7 hours a week
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4c)
I'm going to use the Substitution method
x = price for one adult ticket (in dollars)
y = price for one student ticket (in dollars)
Fact #1
4 adult tickets + 2 student tickets = 64 dollars
4x + 2y = 64
Fact #2
3 adult tickets + 3 student tickets = 60 dollars
3x + 3y = 60
3(x + y) = 60
3(x + y)/3 = 60/3
x + y = 20
x + y-x = 20-x ... subtract x from both sides
y = 20 - x
Plug that into the first equation
4x + 2y = 64
4x + 2(y) = 64
4x + 2(20-x) = 64 ... replace y with 20-x; solve for x
4x + 40-2x = 64
2x + 40 = 64
2x + 40-40 = 64-40
2x = 24
2x/2 = 24/2
x = 12
Use x = 12 to find y
y = 20 - x
y = 20 - 12
y = 8
In summary, x = 12 and y = 8, which means...
One adult ticket costs $12
One student ticket cost $8