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The Question & Answer (Q&A) Knowledge Managenet

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Table of Contents

- Whats the distance between and on a number line?
- What is the distance between 4 and 10 on a number line?
- What is the linear distance between and 17 on the number line?
- What is the distance between 23 and on a number line?
- How do you find the distance between two points?
- What is the distance between 5 7 and − 2 − 2 Round to the nearest tenth if necessary?
- What is the distance between 0 8 and 6?
- What is the distance between points 3 2 and 6 4 to the nearest tenth?
- What is the distance between 0 9 and 12?
- What is the distance between points A and B?
- What does distance mean?
- What is the distance between 5 5 and 9 2?
- What is the length of a line?
- What is the distance between the points (- 6 8 and (- 3 9?
- Which points are four units apart?
- What is the midpoint of 0 and 5?
- What is the distance between the points (- 6 2 and 8/10 on a coordinate grid?
- Which equation correctly shows how do you determine the distance between the points 9 and 6 3?
- How do you find the distance between two points on a coordinate plane?
- Can the distance between two points be a square root?
- What is the distance between two points called?
- What is the shortest distance between two points?
- What is an example of distance formula?
- What do you use the distance formula for?

What is the distance on a number line between and ? Explanation: The distance between 2 numbers on a number line is the sum of their absolute values.

6

21 units

So it would be 23+48=71. This requires looking at the number line in a different way than simple addition or subtraction. The value given (-23) marks a point on the line. The distance between two points is the absolute value of the difference between the numbers.

Distance between two points P(x1,y1) and Q(x2,y2) is given by: d(P, Q) = √ (x2 − x1)2 + (y2 − y1)2 {Distance formula} 2. Distance of a point P(x, y) from the origin is given by d(0,P) = √ x2 + y2. 3. Equation of the x-axis is y = 0 4.

Answer: The distance between (5, 7) and (-2,-2) is 11.4 units.

Answer: This distance between the two points is 10. Step-by-step explanation: You can use The Distance Formula.

3.6 is your answer.

Answer: The distance between the two given points is 15 units.

Definition of Distance between Two Points The distance between any two points is the length of the line segment joining the points. For example, if A and B are two points and if ¯¯¯¯¯¯¯¯AB=10 A B ¯ = 10 cm, it means that the distance between A and B is 10 cm.

the extent or amount of space between two things, points, lines, etc. the state or fact of being apart in space, as of one thing from another; remoteness. a linear extent of space: Seven miles is a distance too great to walk in an hour.

So in short, x1=5, y1=5, x2=9, and y2=2. So exact distance between the two points is 5 units.

The formula for the length of line is the distance formula, which is very similar to the Pythagorean theorem. /displaystyle (x_2-x_1)^2+(y_2-y_1)^2=l^2. Plug in the given values and solve for the length. /displaystyle (5-0)^2+(7-1)^2=l^2. /displaystyle (5)^2+(6)^2=l^2.

So, the distance between these points is √10 units.

Comparing all the given points, B(3,-6) and D(3,-2) are 4 units apart. Such that their X co=ordinate is same and Y differs by 4 units.

2.5

Answer: The distance is 2√65.

Step-by-step explanation: The distance formula is d= . 6 is , 9 is , 3 is y , and -2 is y .

Derived from the Pythagorean Theorem, the distance formula is used to find the distance between two points in the plane. The Pythagorean Theorem, a2+b2=c2 a 2 + b 2 = c 2 , is based on a right triangle where a and b are the lengths of the legs adjacent to the right angle, and c is the length of the hypotenuse.

The hypotenuse is the distance of the two points. Of course, we can square root both sides so we get c = sqrt( 3^2 + 4^2).

The shortest distance between two points is the length of a so-called geodesic between the points. In the case of the sphere, the geodesic is a segment of a great circle containing the two points.

Straight Line

The Distance Formula itself is actually derived from the Pythagorean Theorem which is a 2 + b 2 = c 2 {a^2} + {b^2} = {c^2} a2+b2=c2 where c is the longest side of a right triangle (also known as the hypotenuse) and a and b are the other shorter sides (known as the legs of a right triangle).

The distance formula is a formula used to find the distance between two distinct points on a plane. The formula was derived from the Pythagorean theorem, which states that for any right triangle, the square of the hypotenuse is equal to the sum of the square of the two legs.