It is known that m (3,2) and point M1 (x, y) are on the same straight line parallel to X axis, and the distance from M1 to y axis is equal to 4. What is the coordinate of m point?

It is known that m (3,2) and point M1 (x, y) are on the same straight line parallel to X axis, and the distance from M1 to y axis is equal to 4. What is the coordinate of m point?

Because the distance between M1 and Y axis is 4, the coordinate of M1 is (4, y). And because the line where m (3,2) and M1 (x, 4) are parallel to X axis, the coordinate of M1 is (4,2). In fact, you can draw a picture at a glance

Given that point m (3,2) and point n (x, y) are on the same straight line parallel to X axis, and the distance between point n and Y axis is 5, try to find the coordinates of point n

∵ point m (3,2) and point n (x, y) are on the same straight line parallel to X axis, ∵ y = 2, ∵ the distance from point n to y axis is 5, ∵ x = 5 or - 5, ∵ the coordinates of point n are (5,2) or (- 5,2)

Given that the distance from the point n (3a-2,4-a) to the X axis is equal to twice the distance to the Y axis, then the value of a is ()
A. A = 0b. A = - 1C. A = 0 or a = 87d. A = 87

The distance from the point n (3a-2,4-a) to the x-axis is equal to | 4-A | and the distance from the point n (3a-2,4-a) to the y-axis is | 3a-2 | then | 4-A | = 2 | 3a-2 | and the solution is a = 0 or a = 87

The known point P coordinate is (2-A, 3A + b). If the distance from point P to two coordinate axes is equal, the point P coordinate is equal to

｜2-a｜＝｜3a+b｜