Difference between revisions of "Two poles formula"
Jingwei325 (talk | contribs) (Created page for two pole formula/theorem because at least two pages referenced it without a link, and upon searching for it, I couldn't find it) |
Jingwei325 (talk | contribs) (→Proof using similar triangles) |
||
Line 20: | Line 20: | ||
<cmath>ahp+bhp=abp</cmath> | <cmath>ahp+bhp=abp</cmath> | ||
<cmath>hp(a+b)=abp</cmath> | <cmath>hp(a+b)=abp</cmath> | ||
− | |||
<cmath>h=\frac{ab}{a+b},</cmath> | <cmath>h=\frac{ab}{a+b},</cmath> | ||
as desired. | as desired. | ||
Line 26: | Line 25: | ||
<cmath>Q.E.D.</cmath> | <cmath>Q.E.D.</cmath> | ||
<cmath>\smiley</cmath> | <cmath>\smiley</cmath> | ||
+ | |||
==Coordinate/analytical geometry proof== | ==Coordinate/analytical geometry proof== | ||
Using the same diagram as above, if we let <math>B</math> be the origin, then <math>A,C,</math> and <math>D</math> are the points <math>(0,b),(p,0)</math> and <math>(p,a),</math> respectively. Hence, <math>\overline{AC}</math> and <math>\overline{BD}</math> have slopes of <math>\frac{b-0}{0-p}=-\frac{b}{p}</math> and <math>\frac{a-0}{p-0}=\frac{a}{p}</math>, respectively, and y-intercepts of <math>(0,b)</math> and <math>(0,0)</math>, respectively. That means their equations are <math>y=-\frac{b}{p}x+b</math> and <math>y=\frac{a}{p}x</math>, respectively. | Using the same diagram as above, if we let <math>B</math> be the origin, then <math>A,C,</math> and <math>D</math> are the points <math>(0,b),(p,0)</math> and <math>(p,a),</math> respectively. Hence, <math>\overline{AC}</math> and <math>\overline{BD}</math> have slopes of <math>\frac{b-0}{0-p}=-\frac{b}{p}</math> and <math>\frac{a-0}{p-0}=\frac{a}{p}</math>, respectively, and y-intercepts of <math>(0,b)</math> and <math>(0,0)</math>, respectively. That means their equations are <math>y=-\frac{b}{p}x+b</math> and <math>y=\frac{a}{p}x</math>, respectively. |
Revision as of 18:29, 17 August 2021
Contents
Theorem
The two pole formula/theorem states that for two poles some distance apart, the height of the intersection point of the lines joining the top of either pole to the foot of the opposite pole is half the harmonic mean of the heights of the two poles(and that this is true regardless of the distance between the two poles).
Proof using similar triangles
We are looking to show that for the two poles and of heights and , respectively, and units apart, .
Because , Because , Therefore, as desired.
Coordinate/analytical geometry proof
Using the same diagram as above, if we let be the origin, then and are the points and respectively. Hence, and have slopes of and , respectively, and y-intercepts of and , respectively. That means their equations are and , respectively. Setting the two equations equal to find the intersection point(recall that a point is shared by two lines if and only if it satisfies the equation of both lines), we obtain To find the ordinate, we plug in this to either equation: so is the ordered pair . Therefore, the height is , as desired.