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3 years ago

1. Point M is the midpoint between points A(-5, 4) and B(-1,-6). Find the location of M.

Mathematics

1 answer:

Citrus2011 [14]3 years ago

8 0

Answer:

(-3,-1)

Step-by-step explanation:

$M=(\frac{x1+x2}{2},\frac{y1+y2}{2} )$

$M=(\frac{-5-1}{2},\frac{4-6}{2} )$

$M=(\frac{-6}{2},\frac{-2}{2} )$

$M=(-3,-1)$

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Answer:

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Step-by-step explanation:

the form will need to be the same or a part will be cropped so it fits the photo/portrait

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3 years ago

Can someone explain how to do this please?

Rufina [12.5K]

for the columns where is less than or equal zero, use the first line of the function to calculate the value of f(x)

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hope this helps and gives some insight what to do.

if there are open questions left, feel free to ask them in the comments

have a beautiful day

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3 years ago

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Firlakuza [10]

I can’t see the table. Include an attachment?

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3 years ago

Which relation is a function?

IceJOKER [234]

Answer:

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Step-by-step explanation:

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2 years ago

HELP ASAP FOR BRAINLIEST!

salantis [7]

Answer:

make sure calculator is in "radians" mode
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Step-by-step explanation:

A screenshot of a calculator shows the cos⁻¹ function (also called arccosine). It is often a "2nd" function on the cosine key. To get the answer in radians, the calculator must be in radians mode. Different calculators have different methods of setting that mode. For some, it is the default, as in the calculator accessed from a Google search box (2nd attachment).

The third attachment shows a graph of the cosine function (red) and the value 0.23 (dashed red horizontal line). Everywhere that line intersects the cosine function is a value of A such that cos A = 0.23. There are an infinite number of them. You need to know about the symmetry and periodicity of the cosine function to find them all, given that one of them is A ≈ 1.339.

The solution in the 4th quadrant is at 2π-1.339, and additional solutions are at these values plus 2kπ, for any integer k.

Also in the third attachment is a graph of the inverse of the cosine function (purple). The dashed purple vertical line is at x=0.23, so its intersection point with the inverse function is at 1.339, the angle at which cos(x)=0.23. The dashed orange graph shows the inverse of the cosine function, but to make it be single-valued (thus, a function), the arccosine function is restricted to the range 0 ≤ y ≤ π (purple).

_____

So, the easiest way to answer the problem is to use the inverse cosine function (cos⁻¹) of your scientific or graphing calculator. (Always make sure the angle mode, degrees or radians, is appropriate to the solution you want.) Be aware that the cosine function is periodic, so there is not just one answer unless the range is restricted.

I keep myself "unconfused" by reading cos⁻¹ as the angle whose cosine is. As with any inverse functions, the relationship with the original function is ...

cos⁻¹(cos A) = A

cos(cos⁻¹ a) = a

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3 years ago