The money that Adrian would have to pay for parking if he left his car in the lot for 3 hours is $13 and ther amount that Adrian has to pay if he left his car in the lot for t hours is $(2t + 7)
<h3>How to solve Algebra Word Problems?</h3>
We are given;
Fee for entering the Parking Lot = $7
Fee for one hour of parking = $2
Thus;
Fee for three hours of parking = 2 * 3 = $6
Total fee if he parks his car for 3 hours = $7 + $6
Total fee if he parks his car for 3 hours = $13
Total fee if she left the car for t hours = $(2t + 7)
Finally we conclude that the money that Adrian would have to pay for parking if he left his car in the lot for 3 hours is $13 and ther amount that Adrian has to pay if he left his car in the lot for t hours is $(2t + 7)
Read more about Algebra Word problems at; brainly.com/question/21405634
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Hello there!
To start, first look at the information you already know: your bill without the tax is 725 dollars, and the tax is 6%.
To solve this for the amount of tax added, you must multiply 6% by 725 since the tax is 6% of the bill. Before you do that, first convert 6% to a decimal by moving the decimal two places to the left. This would result in 0.06 as your decimal.
Now, set up your expression to find the amount of sales tax:
0.06*725
When you simplify, you should get that the sales tax is $43.50.
Hope this helps!
<h2>
The lowest fraction is is equal to .</h2>
Step-by-step explanation:
We have,
To find, the smallest fraction = ?
∴
=
∴ The LCM of 3, 4, 2, 5, 3 and 8 = 120
=
The all denominator of fraction are same, the lowest fraction is numerator is smallest.
∴ The smallest fraction = i.e.,
Thus, the lowest fraction is is equal to .
It will be 2000 as the highest place
Answer: The required probability that a randomly selected day in November will be snowy if it is cloudy is 86.79%.
Step-by-step explanation: Given that for the month of November in a certain city, 53% of the days are cloudy. Also in the month of November in the same city, 46% of the days are cloudy and snowy.
We are to find the probability that a randomly selected day in November will be snowy if it is cloudy.
Let A denote the event that the day is cloudy and B denote the event that the day is snowy.
Then, according to the given information, we have
Now, we need to find the conditional probability of event B given that the event A has already happened.
That is, P(B/A).
We know that
Thus, the required probability that a randomly selected day in November will be snowy if it is cloudy is 87.79%.