MATHEMATICS MIDDLE SCHOOL

Find the midpoint of A and B where A has coordinates (2,7)
and B has coordinates (6,3).

Answers

Answer 1
Answer:

The midpoint of A and B where A has coordinates (2,7) and B has coordinates (6,3) is (4, 5)

If B(x, y) is the midpoint of the line segment AC with end points at A(x₁, y₁) and C(x₂, y₂), the coordinates of B is:

x = (x₁ + x₂)/2; y = (y₁ + y₂)/2

Let O(x, y) be the midpoint of A and B where A has coordinates (2,7) and B has coordinates (6,3). Hence:

x = (2 + 6)/2 = 4; y = (7 + 3)/2 = 5

Hence the midpoint of A and B is (4, 5)

Find out more at: brainly.com/question/2441957
Answer 2
Answer:

Given that the coordinates of the point A is (2,7) and the coordinates of the point B is (6,3)

We need to determine the midpoint of A and B

Midpoint of A and B:

The midpoint of A and B can be determined using the formula,

Midpoint =((x_1+x_2)/(2), (y_1+y_2)/(2))

Substituting the points (2,7) and (6,3) in the above formula, we get;

Midpoint =((2+6)/(2), (7+3)/(2))

Adding the numerator, we have;

Midpoint =((8)/(2), (10)/(2))

Dividing the terms, we get;

Midpoint =(4, 5)

Thus, the midpoint of the points A and B is (4,5)

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What is 8.07 written in word form

Answers

Eight and 7 hundredths
eight and seven hundredths.

What is the slope of the line passing through the points (−1, 7)and (4, −1)−2
2
8/8
-5/6

Answers

(-1,7)(4,-1) m=y2-y1/x2-x1

-1-7= -8
4-(-1)= 5

wouldnt the slope be -8/5?

Can someone explain how to do number 3 please?! The answer is 1 over 32

Answers

Since we are doing flips of a coin, we can agree that each flip is independent of all of the other.

The probability that a coin lands on heads is 1/2, just as the probability that a coin lands on tails is 1/2.

Since each event is independent, we take the probabilities of the events and multiply them together to get the overall probability:

P(H) = 1/2
P(T) = 1/2

So:

P(H, T, H, H, H) = (1/2) x (1/2) x (1/2) x (1/2) x (1/2) = 1/32

The overall probability is 1/32.

25,386 round The Number To The Nearest thousand

Answers

The equivalent number in the nearest thousand is 25,000

The given number:

25,386

To find:

  • the equivalent number in the nearest thousand

To round up this number to the nearest thousand, start from the last digit.

  • if the last digit is up to 5, round up to 1 and add it to the digit at its back
  • if the preceding digit is not up to 5, round down to zero (0)

In the given number

  • 6 is up to 5, round it up to 1 and add it to 8
  • 8 becomes 9, round up to 1 and add it 3
  • 3 becomes 4, it is less than 5, round down to 0
  • after 3, stop, since thousand must have at least 3 zeros

The final number becomes, 25,000

Learn more here: brainly.com/question/4896544
First, the place value "thousand" is where the '5' is in 25,386.
Now, look at the numbers following the five. 386 does not round up to 1000 but rounds down to 0 instead since it is not 500 or more.
So, 25,386 to the nearest thousand place is 25,000.

Hope this helped! :)

Verify the identity tan x + cot x / tan x - cot x = 1/ sin^2x - cos^2x

Answers

(\tan x+\cot x)/(\tan x-\cot x)=(1)/(\sin^2x-\cos^2x)\n\n\text{use}\ \tan x=(\sin x)/(\cos x),\ \cot x=(\cos x)/(\sin x)\n\n\tan x+\cot x=(\sin x)/(\cos x)+(\cos x)/(\sin x)=(\sin x\cdot\sin x)/(\sin x\cos x)+(\cos x\cdot\cos x)/(\sin x\cos x)\n\n=(\sin^2x+\cos^2x)/(\sin x\cos x)\n\n\text{use}\ \sin^2x+\cos^2x=1\n\n=(1)/(\sin x\cos x)\n\n\tan x-\cot x=(\sin x)/(\cos x)-(\cos x)/(\sin x)=(\sin^2x-\cos^2x)/(\sin x\cos x)


L_s=(\tan x+\cot x)/(\tan x-\cot x)=((1)/(\sin x\cos x))/((\sin^2x-\cos^2x)/(\sin x\cos x))=(1)/(\sin x\cos x)\cdot(\sin x\cos x)/(\sin^2x-\cos^2x)\n\n=(1)/(\sin^2x-\cos^2x)=R_s\n\nL_s=R_s\Rightarrow The\ identity.

PLEASE HELP I GIVE THANKS

Answers

For cylinders to be similar, the ratio between their height and radius must be equal.Our cylinder's ratio is :
\frac { length }{ radius } =\frac { 15 }{ 3 } \n =5

The only cylinder with same ratio is the one at the choice B.

\frac { length }{ radius } \frac { 25 }{ 5 } =5 
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