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Dmitriy Fialkovskiy · Answer 1 · 2019-10-12T04:18:50+0000

Answer:

Standard form:
$\left(x-(9)/(2)\right)^2+(y+5)^2=(121)/(4).$

This equation represents the circle with the center at the point
$\left((9)/(2),-5\right)$ and the radius
r=(11)/(2).

Explanation:

Consider expression
x^2+y^2-9x+10y+15=0.

First, form perfect squares:

$(x^2-9x)+(y^2+10y)+15=0,\\ \\\left(x^2-9x+(81)/(4)\right)-(81)/(4)+(y^2+10y+25)-25+15=0,\\ \\\left(x-(9)/(2)\right)^2+(y+5)^2=10+(81)/(4),\\ \\\left(x-(9)/(2)\right)^2+(y+5)^2=(121)/(4).$

This equation represents the circle with the center at the point
$\left((9)/(2),-5\right)$ and the radius
r=(11)/(2).

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