Options:
The answer is the third option "10; it represents the hourly wage for the worker." 10 would be the slope and if x represents hours then 10 would represent the amount of money the worker would get every hour.
Hope this helps!
Answer:
10
Step-by-step explanation:
Given that the local ice cream shop is deciding whether or not to hire a new worker. The shop must pay the worker hourly and cover a daily cost for insurance. The cost to pay an hourly worker for one day is represented by the function y=10x+30 where x=hours.
We find that this is of the form y = mx+B where
m=10 and B =30
Hence slope =m =10
Answer is 10
and it represents the rate of change of y for a unit change in x.
b. combining two or more numbers to find their difference.
c. combining two or more numbers to find their product.
d. combining two or more numbers to find their quotient.
0.27 is the decimal representation of 27/100.
A number system is defined as a system of writing to express numbers.
The given fraction is 27/100.
The numerator is twenty seven and denominator is hundred.
We have to find the decimal representation of the fraction 27/100.
When we take division process, the divisor is 100 and dividend is 27.
The quotient we get after division is 0.27
Hence, 0.27 is the decimal representation of 27/100.
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Answer:
To multiply the expressions (3x + 2y + 1) and (2x - 3y - 5) vertically, we will use the distributive property and multiply each term from the first expression with each term from the second expression.
Starting with the first term in the first expression, which is 3x, we multiply it with each term in the second expression:
(3x) * (2x) = 6x^2
(3x) * (-3y) = -9xy
(3x) * (-5) = -15x
Next, we move to the second term in the first expression, which is 2y:
(2y) * (2x) = 4xy
(2y) * (-3y) = -6y^2
(2y) * (-5) = -10y
Finally, we multiply the last term in the first expression, which is 1, with each term in the second expression:
(1) * (2x) = 2x
(1) * (-3y) = -3y
(1) * (-5) = -5
Now, let's add up all the results:
6x^2 - 9xy - 15x + 4xy - 6y^2 - 10y + 2x - 3y - 5
Simplifying this expression further, we have:
6x^2 - 5x - 6y^2 - 7xy - 13y - 5
Answer:
To multiply the expressions (3x+2y+1) and (2x-3y-5) vertically, you can use the distributive property and follow these steps:
1. Start by multiplying the first term in the first expression, 3x, by each term in the second expression:
- (3x) * (2x) = 6x^2
- (3x) * (-3y) = -9xy
- (3x) * (-5) = -15x
2. Move on to the second term in the first expression, 2y:
- (2y) * (2x) = 4xy
- (2y) * (-3y) = -6y^2
- (2y) * (-5) = -10y
3. Finally, multiply the last term in the first expression, 1, by each term in the second expression:
- (1) * (2x) = 2x
- (1) * (-3y) = -3y
- (1) * (-5) = -5
Now, let's combine the like terms:
6x^2 + (-9xy) + (-15x) + 4xy + (-6y^2) + (-10y) + 2x + (-3y) + (-5)
Simplifying this expression further, we have:
6x^2 - 5x - 9xy + 4xy - 6y^2 - 10y + 2x - 3y - 5
Therefore, the result of multiplying (3x+2y+1) and (2x-3y-5) vertically is 6x^2 - 5x - 9xy + 4xy - 6y^2 - 10y + 2x - 3y - 5.
Step-by-step explanation: