Answer:
X= cost of the tires
t(x)= (.9*X+10)*1.06
If x = 300, then the costo is (.9*300 + 10) *1.06 = (270 + 10)* 1.06 = 280 * 1.06 = $296.80
If the tax is appplied first and then the discount is applied, your formula would be:
t(x) = (x+10)*1.06 - (-1*x)
If x is equal to $300, the cost is $310 * 1.06 - .1*300 = $328.60 - $30 = $298.60
you pay mor if the tax is applied first.
Your discounted price of .9*x stems from x - .10*x which becomes (1-.10)*x wich becomes .9*x
Your cost with tax stems from y + .06*x =(1+.06)*y = 1.06*y
Y is the amount of the cost that is taxed.
if the discuount is applied first, then y is equal to (.9*x + 10)
if the discount is applied after, then y is equal to (x+10).
The difference is the tas on the discount
Explanation:
Answer:
[tex]t(x)= x+0.06x\\[/tex]
or
[tex]t(x)= 1.06*x[/tex]
Explanation:
if we take x as the tyre cost ($ 300)
Tax = 6%
the function ignoring the discounts and fees would be:
[tex]t(x)= x+0.06x[/tex]
Now including discounts and fees, can be done by two ways
1) adding taxes before discount
To the price 300 add 6% tax = 318
discount would be 318 * 10% = 31.8
then the cost is 318 - 31.8 = 286.2
2) adding taxes after discount
To the price (300) we will apply the 10% discount
discount would be 300 * 10% = 30
price now will be 300- 30 = 270
now to the calculated price add the 6% tax
270* 1.06 = 286.2
