Answer:
Step-by-step explanation:
First, find the <em>rate of change</em> [<em>slope</em>]:
Then plug these coordinates into the Slope-Intercept Formula instead of the <em>Point-Slope</em><em> </em><em>Formula</em><em> </em>since you get it swiftly that way. It does not matter which ordered pair you choose:
2 = ⅓[12] + b
4
If you want it in <em>Standard</em><em> </em><em>Form</em>:
y = ⅓x - 2
- ⅓x - ⅓x
_________
−⅓x + y = −2 [We do not want fractions in our standard equation, so multiply by the denominator to get rid of it.]
−3[−⅓x + y = −2]
_______________________________________________
−3 = ⅓[−3] + b
−1
If you want it in <em>Standard Form</em>:
y = ⅓x - 2
- ⅓x - ⅓x
_________
−⅓x + y = −2 [We do not want fractions in our standard equation, so multiply by the denominator to get rid of it.]
−3[−⅓x + y = −2]
** You see? I told you it did not matter which ordered pair you choose because you will always get the exact same result.
I am joyous to assist you anytime.
Answer:
Linear pair
Step-by-step explanation:
Here in this question, we want to know the relationship between two straight angles.
These two straight angles are referred to as linear pairs. Two angles are referred to as linear pairs if when added together gives a total of 180 degrees.
Mathematically, we can recall that the sum of angles on a straight line is 180. Since these two angles lie on a straight line , then both angles are called a linear pair
Answer:
y=9/8
Step-by-step explanation:
dont have one
Answer:
factors of
Step-by-step explanation:
We need to find factors of
So, factors of