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What is the y intercept of the line represented by the equation
3x+2y = 6?
Answers
Answer:
3
Step-by-step explanation:
To identify the y-intercept represented by the given equation, we need to get the equation into slope-intercept from:
Start with:
Subtract from both sides of the equation:
Divide both sides of the equation by the coefficient of , which is
:
Identify the y-intercept:
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Jades braces cost her parents $2848 her parents will pay $89 each month how many months would take them to pay for her braces
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Suppose that 30% of all students who have to buy a text for a particular course want a new copy (the successes!), whereas the other 70% want a used copy. Consider randomly selecting 15 purchasers.The bookstore has 10 new copies and 10 used copies in stock. If 15 people come in one by one to purchase this text, what is the probability that all 15 will get the type of book they want from current stock?
Answers
Answer:
The correct answer is B.
Step-by-step explanation:
Numerical Answers Expected!
Answers
a=0.
(4xy^3+8x^2y^5)/(2xy^2) (4xy^3+8x^2y^5)/(2xy^2) Since 2xy^2 is a common factor we have
Go to do 2y+4xy^3
Then do 2y=2x^ay^b
Then Do x^0=x^a
Then, you'll get the answer of a=0.
Answers
Answer:
We know that triangle ABD and triangle CBD are congruent because of SAS.
Step-by-step explanation:
AB is congruent to BC because of the definition of an isosceles triangle
BD=BD because of the reflexive property
m<ABD=m<CBD because BM is the median of an isosceles triangle
Thus, triangle ABD is congruent to triangle CBD because of SAS
Answers
Answer:
4.332 times 10^3
Step-by-step explanation:
ion kno if thats right but i tried.
Answer:
4.332 x 10 to the 3 power I do believe
Step-by-step explanation:
Answers
An isosceles triangle is that the triangle must have two sides of equal length.
Triangle QNP is isosceles triangle because, QN = PN
In triangle QMN,
Since, QM = QN
So, ∠QMN = ∠QNM
By property of triangle:
∠MQN + ∠QNM + ∠QMN = 180
48 + 2 ∠QNM = 180
∠QNM = = 66 degree
So, ∠QMN = ∠QNM = 66 degree
from figure,
∠QNM + ∠QNP = 180
∠QNP = 180 - 66 = 114 degree.
In triangle QNP,
∠QNP + ∠PQN + ∠QPN = 180
∠QPN = 180 - 33 - 114 = 33 degree
Since, ∠QNP = ∠QPN = 33 degree
Therefore, triangle QNP is isosceles triangle.
Learn more:
Answer/Step-by-step explanation:
Let's find the measure of the angles of ∆QNP.
∆QMN is am isosceles ∆, because it has two equal sides. Therefore, its base angles would be the same. Thus:
m<MNQ = ½(180 - 48) (one of the base angles of ∆QMN)
m<MNQ = ½(132) = 66°
Next, find m<QNP
m<QNP = 180° - m<MNQ (linear pair angles)
m<QNP = 180° - 66° (Substitution)
m<QNP = 114°
Next, find m<P
m<P = 180 - (m<QNP + m<PQN) (sum of ∆)
m<P = 180 - (114 + 33)
m<P = 180 - 147
m<P = 33°
Thus, in ∆QNP, there are two equal angles, namely, <P and <PQN.
An isosceles ∆ had two equal base angles. Therefore, ∆QNP must be an isosceles ∆.
Answers
Answer:
- first one:
f(x) approches -∞
we can see clearly in the graph that the function is decreasing toward infinity
- second one:
f(x) approches 1
we can that y=1 represents an asymptote
f(x) is growing toward 1 without reaching it