Which of the following ordered pairs represents the solution to the system given below? x − 4y = 7
5x + 9y = 6
Answers
5x + 9y = 6
5x − 20y = 35 //1st * 5
5x + 9y = 6
5x +9y - 5x + 20y = 6 - 35 //2nd - 1st
5x + 9y = 6
29y=-29
5x=6-9y
y=-1 //1st : 29
5x=6-9*(-1)
y=-1
x=15:5 //2nd : 5
y=-1
x=3
check:
for x=3 and y=-1 there is:
x − 4y = 7 is 3 − 4*(-1) = 7 is 7=7 ok
5x + 9y = 6 is 15-9=6 is 6=6 ok
answer: (3;-1) represents the solution.
Answer:
It’s 3,-1
Step-by-step explanation:
You have to plug in the points u can use a calculator or work it by hand but I did it on the calculator and that’s what I got
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Which function has a larger maximum? Type your answer as 1 or 2.
Answers
Answer:
The function 2 has a larger maximum.
Step-by-step explanation:
The vertex form of the parabola is
.... (1)
Where, (h,k) is the vertex.
The given functions are
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Since the leading coefficient is negative, therefore it is a downward parabola. It means the vertex of the parabola is the maximum point.
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Therefore function 2 has a larger maximum.
Answer:
the anwser is 2 guys. i got it correct
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Step-by-step explanation:
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Step-by-step explanation:
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Final answer:
Partial fractions are used in numerous aspects of everyday life, especially in fields requiring mathematical calculations. This includes engineering, calculus, computer science, signal processing, and electrical circuits. While we may not directly observe their use, their applications make many of our daily operations possible.
Explanation:
The concept of partial fractions is widely used in numerous aspects of our daily life, especially in fields that require mathematical calculations. Partial fractions make complex mathematical processes simpler and easier to solve.
For instance, in the field of engineering, partial fractions are used to simplify complex fractions in control system design, particularly in Laplace Transform. Moreover, it's also used in calculus to integrate rational functions.
In the realm of computer science, partial fractions can assist with algorithm efficiency when dealing with fractions or rational numbers. They are also used in signal processing and electrical circuits, which are a major part of our daily life as most electronics operate on these principles.
In everyday life, the use of partial fractions might not be directly observed but their applications in various fields make many of our daily life operations and technologies possible.
Learn more about Uses of Partial Fractions here:
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Answers
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Step-by-step explanation: