The original price p for one lunch special is $20 without any discount
It is given that,
Ali wins a coupon for $3 off the lunch special for each of 5 days, which means for the next 5 days lunch he will have to pay $3 less on each lunch
Discount coupon are customized or widely available codes that are made available to customers as a purchase incentive and lower the cost of an order.
Now,
Ali pays $85 for his 5 lunch specials
We need to find the original price p for one lunch special
The original price which Ali has to pay without any discount =
$85 + ($3) x 5 = $85 + $15 = $100
Also, we need to find his each lunch meal price for 5 days =
p = = $20
Hence, the original price p for one lunch special is $20.
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I think this is the sans we 70,000,000
We have that to find the possible values of x-y
We permutate every value of x minus every value of y
i.e
x(3,4)-y(2,3,4,5,6)
From the question we are told that
2< x < 5
1 < y<7.
Generally We know that
x is range of numbers from
3,4
y is range of numbers from
2,3,4,5,6
Therefore to find the possible values of x-y
We permutate every value of x minus every value of y
i.e
x(3,4)-y(2,3,4,5,6)
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Answer:
Step-by-step explanation:
In a geometric sequence, the consecutive terms differ by a common ratio,r. Considering the given sequence,
r = 6/- 2 = - 18/6 = - 3
Therefore, the sequence is geometric.
The formula for determining the nth term of a geometric progression is expressed as
Tn = ar^(n - 1)
Where
a represents the first term of the sequence.
r represents the common ratio.
n represents the number of terms.
From the information given,
a = - 2
r = - 3
The explicit formula is
Tn = - 2 × (- 3)^(n - 1)
To find the 8th term, T8,
T8 = - 2 × (- 3)^(8 - 1)
T8 = - 2 × (- 3)^7
T8 = - 2 × - 2187
T8 = 4374
Answer:-8d -9dd
Step-by-step explanation:I looked it up :)I'm not good at math so yeahhh but I hope this is right but if not I'll try again