A line segment is bisected by a line with the equation $5 y + 2 x = 1$ $5 y + 2 x = 1$ . If one end of the line segment is at $(3, 4)$ $(3 ,4 )$ , where is the other end?

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A line segment is bisected by a line with the equation $5 y + 2 x = 1$ $5 y + 2 x = 1$ . If one end of the line segment is at $(3, 4)$ $(3 ,4 )$ , where is the other end?

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Answer 1 · 2017-10-07T05:08:00

the other is end is at $(- \frac{13}{29}, - \frac{134}{29})$ $(-13/29, -134/29)$

Explanation:

The given line is $5 y + 2 x = 1$ $5y+2x=1$
The line perpendicular to this line and passing thru point $U (3, 4)$ $U(3, 4)$ is
$y - 4 = (\frac{5}{2}) (x - 3)$ $y-4=(5/2)(x-3)$ by the two-point form
or $5 x - 2 y = 7$ $5x-2y=7$
Simultaneous solution of
$2 x + 5 y = 1$ $2x+5y=1$ and $5 x - 2 y = 7$ $5x-2y=7$ yields point $I (\frac{37}{29}, - \frac{9}{29})$ $I(37/29, -9/29)$

Let $v =$ $v=$ vertical distance from point $I (\frac{37}{29}, - \frac{9}{29})$ $I(37/29, -9/29)$ to $U (3, 4)$ $U(3, 4)$
$v = 4 - - \frac{9}{29} = \frac{125}{29}$ $v=4--9/29=125/29$
Let $h =$ $h=$ horizontal distance from point $I (\frac{37}{29}, - \frac{9}{29})$ $I(37/29, -9/29)$ to $U (3, 4)$ $U(3, 4)$
$h = 3 - \frac{37}{29} = \frac{50}{29}$ $h=3-37/29=50/29$
Let the other end point be $D (x_{o}, y_{o})$ $D(x_o, y_o)$

$x_{o} = \frac{37}{29} - h = \frac{37}{29} - \frac{50}{29} = - \frac{13}{29}$ $x_o=37/29-h=37/29-50/29= -13/29$
$y_{o} = - \frac{9}{29} - \frac{125}{29} = - \frac{134}{29}$ $y_o=-9/29-125/29=-134/29$

Check by distance formula from point $I (\frac{37}{29}, - \frac{9}{29})$ $I(37/29, -9/29)$ to $U (3, 4)$ $U(3, 4)$
$d_{1} = \sqrt{{(3 - \frac{37}{29})}^{2} + {(4 - - \frac{9}{29})}^{2}} = \frac{25 \sqrt{29}}{29}$ $d_1=sqrt((3-37/29)^2+(4--9/29)^2)=(25sqrt(29))/29$

Check by distance formula from point $I (\frac{37}{29}, - \frac{9}{29})$ $I(37/29, -9/29)$ to $D (- \frac{13}{29}, - \frac{134}{29})$ $D(-13/29, -134/29)$
$d_{2} = \sqrt{{(\frac{37}{29} - - \frac{13}{29})}^{2} + {(- \frac{9}{29} - - \frac{134}{29})}^{2}} = \frac{25 \sqrt{29}}{29}$ $d_2=sqrt((37/29--13/29)^2+(-9/29--134/29)^2)=(25sqrt(29))/29$

Therefore $d_{1} = d_{2}$ $d_1=d_2$

God bless....I hope the explanation is useful.

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A line segment is bisected by a line with the equation $5 y + 2 x = 1$ $5 y + 2 x = 1$ . If one end of the line segment is at $(3, 4)$ $(3 ,4 )$ , where is the other end?

1 Answer

Explanation:

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Science

Math

Humanities

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A line segment is bisected by a line with the equation 5y+2x=1 5 y + 2 x = 1 . If one end of the line segment is at (3,4)(3 ,4 ), where is the other end?

1 Answer

Explanation:

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Impact of this question

A line segment is bisected by a line with the equation $5 y + 2 x = 1$ $5 y + 2 x = 1$ . If one end of the line segment is at $(3, 4)$ $(3 ,4 )$ , where is the other end?