Answer:
∠1 = 48°
∠2 = 132°
∠3 = 48°
Step-by-step explanation:
∠1 = (360-132-132)/2 = 48°
∠2 = 132° because it is the alternate angle to 132°
∠3 = 48° because it is the alternate angle to ∠1
Two key parts of this solution.
<u>1) </u><u /><u>Set up the right equations.</u> Let's say that x is the number of hours during the weekdays, and y is the number of weekend hours. In each week, Ramiro will earn $20*x for his work on weekdays and $30*y for his work on weekends. The second sentence tells us that in this week, the total is $650. So, our first equation is:
20x + 30y = 650
The third sentence tells us that x is 5 times as many hours as y. In other words:
x = 5y
<u>2) Solve for one of the variables.</u><u /> Now that you have 2 equations with 2 variables, you can manipulate the equations to cancel out one variable and solve for the other. Since the question asks for the number of weekend hours, let's solve for y.
Here, it's easier to just substitute x in the original equation. If you put 5y in place of x, the equation becomes:
(20*5y) + 30y = 650
expand -->
100y + 30y = 650
add -->
130y = 650
divide both sides by 10 -->
13y = 65
divide both sides by 13 -->
y = 5
So, Ramiro worked 5 hours on the weekend (and therefore, 25 during the week).
The coefficient of 'y' in her simplified answer is 10.
Answer:
x-intercept = -6
<h2>y-intercept = -21</h2>
Step-by-step explanation:
x - intercept is for y = 0
y - intercept is for x = 0.
We have y = -2x - 21.
Substitute:
x = 0 → y = -2(0) - 12 = 0 - 12 = -12
y = 0 → 0 = -2x - 12 <em>add 2x to both sides</em>
2x = -12 <em>divide both sides by 2</em>
x = -6
Answer:
The variables x and y represents the input variable and y represents the output variable.
Step-by-step explanation:
Consider the provided information.
When the bivariate data are the result of two quantitative variables, it is customary to express the data mathematically as ordered pairs (
x,
y),
In mathematics or algebra x is the input variable or we can say that the independent variable.
y is the output variable or we can say that the dependent variable.
Therefore, the variables x and y represents the input variable and y represents the output variable.