The distance between the points 46 and 73 can be calculated using the expression |73 - 46|. This simplifies to |27|, which equals 27. Thus, the distance between the points is 27 units.
73
Distance = sqrt(x2 + y2)
True. Distance can be represented by absolute values, as absolute value measures the non-negative distance between two points on a number line. For example, the distance between two numbers (a) and (b) can be expressed as (|a - b|), which gives the positive difference between them regardless of their order.
The distance between two points on a coordinate plane is calculated using the distance formula: Distance = √((x2 - x1)^2 + (y2 - y1)^2) In this case, the coordinates of the two points are (7, 1) and (7, 3). Since the x-coordinates are the same, we only need to calculate the difference in the y-coordinates, which is (3 - 1) = 2. Plugging this into the distance formula gives us: Distance = √((0)^2 + (2)^2) = √4 = 2. Therefore, the distance between the two points is 2 units.
The distance between the points 46 and 73 can be calculated using the expression |73 - 46|. This simplifies to |27|, which equals 27. Thus, the distance between the points is 27 units.
Distance = (9-5)2+(-6-1)2 = 65 and the square root of this is the distance between the points which is about 8.062257748
The distance between two points is: square root of [(x1-x2)^2 plus (y1-y2)^2] An exact answer could have been given if the points were properly enumerated.
If you mean points of: (2, 5) and (-4, 8) Distance is the square root of (2--4)^2+(5-8)^2 = 6.708 rounded
73
square root of (5-9)^2+(1+6)^2
square root of (5-9)^2+(1+6)^2
Distance: square root of [(4-7)squared+(6--3)squared)] = 3 times sq rt of 10 which is about 9.487 rounded
the area of a rectangle with width x and length 6x is 6x^2 what does the coefficient 6 mean in terms of the problem
If you mean: (4, 6) and (7, -3) then it is:- Distance is the square root of (4-7)^2+(6--3)^2 = 9.487 rounded to 3 decimal places
square root of (5-9)^2+(1+6)^2
Distance = sqrt(x2 + y2)