MATHEMATICS HIGH SCHOOL

If R and S are two points in the plane, the perpendicular bisector of is the set of all points equidistant from R and S.A. True
B. False

Answers

Answer 1
Answer:

The Meaning of term ,  perpendicular bisector, is that it divides the line segment into two congruent parts.

and Secondly if you will take any point on the perpendicular bisector ,it will be equidistant from both the points for which you have drawn perpendicular bisector.

So, if R and S are two points in the plane, the perpendicular bisector of is the set of all points equidistant from R and S.

So, the given statement is True Statement.
Answer 2
Answer:

Answer:

True

Step-by-step explanation:

I took the A-P-E-X Quiz

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Which value is equivalent to 15.2% written as a decimal

Answers

p\%=(p)/(100)\n\n\n15.2\%=(15.2)/(100)=0.152

How do i find the slope of a line that passes through a given point and is parallel or perpendicular to another given point?

Answers


There's no such thing as parallel or perpendicular "to a point".  A problem like that
will always want the new line to be parallel or perpendicular to another line.

-- If the new line is parallel to the given line, then they have the same slope.

-- If the new line is perpendicular to the the given line, then the slope of the
new line is [ 1 / slope of the given line ].

In either case, you now have the slope of the new line and a point on it. 
From there, you should have no trouble finding its equation.
Parallel is same slope.
Perpendicular is same slope but you have make it opposite and flip it.
For example if your slope is 2/3. For Perpendicular it would be - 3/2.

a pack of toy cars contains 12 cars. if Sylvia buys only packs of 12, what are two possible numbers of cars that she could buy

Answers

Answer: 36 and 24

Step-by-step explanation:

Hi, since a pack of cars has 12 cars, if she buys only packs, the possible number of cars that she could buy will be multiples of 12.

Multiples of 12: 12,24,36,48,60,72,84,96,108,120, etc

We can pick any multiple of 12.

For example if she buys 3 packs of cars:

3 x 12 = 36 cars

If she buys 2 pack of cars:

2x12=24 cars

Feel free to ask for more if needed or if you did not understand something.

24, 36, 48 etc.. just keep adding 12

Robert runs 25 miles. His average speed is 7.4 miles per hour. He takes a break after 13.9 miles. How many more hours does he run? Show your work

Answers

Answer: Robert runs for approximately 1.50 more hours after taking a break.

Step-by-step explanation:

To find out how many more hours Robert runs after taking a break, we need to determine the time it takes for him to run the remaining distance.

We know that Robert runs a total of 25 miles and his average speed is 7.4 miles per hour. To find the time it takes for him to run the entire 25 miles, we can use the formula:

Time = Distance / Speed

Time = 25 miles / 7.4 miles per hour

Time ≈ 3.38 hours

Since Robert takes a break after running 13.9 miles, we need to subtract the time it took him to run that distance from the total time.

To find the time it took him to run 13.9 miles, we can use the formula:

Time = Distance / Speed

Time = 13.9 miles / 7.4 miles per hour

Time ≈ 1.88 hours

Now, we can subtract the time for the break from the total time to find how many more hours Robert runs:

Remaining time = Total time - Time for the break

Remaining time ≈ 3.38 hours - 1.88 hours

Remaining time ≈ 1.50 hours

Therefore, Robert runs for approximately 1.50 more hours after taking a break.

Answer:

1.5 hours more

Step-by-step explanation:

In order to find out how many more hours Robert runs, we need to find the total time it takes him to run 25 miles. We can do this by dividing the total distance by his average speed.

\sf \textsf{Total time }= \frac{\textsf{Total distance }}{\textsf{ Average speed}}

\sf \textsf{Total time }=\frac{ 25 miles }{7.4\textsf{ miles per hour}}

\sf \textsf{ Total time = 3.378378378378378 hours}

We already know that Robert takes a break after 13.9 miles. This means that he runs for:

\sf \textsf{25 miles - 13.9 miles = 11.1 miles after his break}

And to find out how many hours Robert runs after his break, we need to divide the distance he runs after his break by his average speed.

\sf \textsf{Time after break } =\frac{\textsf{ Distance after break }}{\textsf{Average speed}}

\sf \textsf{Time after break CD call }=\frac{ 11.1 miles }{\textsf{ 7.4 miles per hour}}

\sf \textsf{Time after break = 1.5 hours}

Therefore, Robert runs for 1.5 hours more after his break.

Of the 250 sheep in the flock, 34% are gray. What is the total number of gray sheep in the flock?

Answers

Answer:

85 sheep are grey

Step-by-step explanation:

In AUVW, UW is extended through point W to point X, mZWUV = (3.2 - 4)º,m VWX = (6x + 6), and mZUVW = (x + 20). What is the value of x?

Answers

That is the answer 82
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