(1 point) Find the point on the line y=6x that is closest to the point P=(1,2)
Point = (_ , _)
(1 point) Find the point on the line y=6x that is closest to the point P=(1,2)...
Find the point P on the line y = 3x that is closest to the point (20,0). What is the least distance between P and (20,0)? The point P on the line y = 3x that is closest to the point (20,0) is (Type an ordered pair.) The least distance between P and (20,0) is approximately (Round to the nearest tenth as needed.)
1. Find the point on line L that is closest to point P. (a) L: y = 5x - 4, P = (0,9) (b) L: the line through (-1,6) and (3,0), P = (4,5) You need to (i) Draw a graph (ii) Find the equation of L, if not already given (iii) Find the slope perpendicular to L, slope p=- (iv) Find the equation of the line with this two perpendicular slope through P (v) Interesect the two lines
Find the point on the line y - 3x + 5 closest to the point (1,3). The function giving the distance between the point and the line is 8 (Enter a function of 2) (Enter the coordinates of the point. Be The point closest to the line is sure to include commas and parentheses as required.
Find the point on the line y = 8x + 6 closest to the point (2, – 9). The function giving the distance between the point and the line is S = (Enter a function of x) (Enter the coordinates of the point. Be sure The point closest to the line is to include commas and parentheses as required. Check Answer
10. Find the point on the line y = 4x + 5 that is closest to the origin. (x, y) = (
3. What point on the line y = 7 - 3x is closest to the origin? a. Sketch the line carefully and mark the point on the line that you think is closest to the origin. b. Write the distance between the origin and a point (x,y) in the plane. If you don't know, think of a triangle with base x and height y. 8 7 6 c. The point must be on the line, so you can write the...
=> (x² - 6x) y - y = 0 Find the singular point and ordinary point of this equation.
5. Find parametric equations for the line through the point (0, 1,2) that is orthogonal to the line x = 1 + t, y 1-t, 2t, and intersects this line. (Hint: Try drawing this scenario in two dimensions, ie. draw two orthogonal lines and a point on each line away from the intersection. How would you find the direction vector?)
4. Find the closest point to P(1,2,3) on the surface z2+2y? +5:- 1 4. Find the closest point to P(1,2,3) on the surface z2+2y? +5:- 1
Write the equation of the line parallel to a line with the equation y=-6x+4 that passes through the point (-2,6).