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Find the distance between the points $(9,2)$ and $(3,10)$ . $\newline$ $\newline$ Write your answer as a whole number or a fully simplified radical expression. Do not round. $\newline$ $\newline$ ______ units

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Distance between two points

Full solution

Q. Find the distance between the points

(9,2)

and

(3,10)

.

\newline

\newline

Write your answer as a whole number or a fully simplified radical expression. Do not round.

\newline

\newline

______ units

Identify Coordinates and Formula: Identify the coordinates of the two points and the distance formula. $\newline$ The coordinates are given as $(9,2)$ for the first point and $(3,10)$ for the second point. The distance formula is $\sqrt{(x_2-x_1)^2 + (y_2-y_1)^2}$ .
Substitute Coordinates into Formula: Substitute the coordinates into the distance formula. $\newline$ Using the points $(9,2)$ and $(3,10)$ , we get the following expression for the distance: $\newline$ Distance: $\sqrt{(3-9)^2 + (10-2)^2}$
Calculate X-coordinate Difference: Calculate the difference between the x-coordinates and square it. $\newline$ Calculate $(3-9)^2$ : $\newline$ $(3-9)^2 = (-6)^2 = 36$
Calculate Y-coordinate Difference: Calculate the difference between the y-coordinates and square it. $\newline$ Calculate $(10-2)^2$ : $\newline$ $(10-2)^2 = (8)^2 = 64$
Add Squares and Find Square Root: Add the squares of the differences and find the square root. $\newline$ Calculate $\sqrt{36 + 64}$ : $\newline$ $\sqrt{36 + 64} = \sqrt{100} = 10$

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