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@oak vapor Let A (7,16), B(13,8), C(2,3)

Find the midpoint M of A and B and the distance between M and C

Just write down solution no need explanation

Use wolfram

Calling function wolfram...

{
"search_query": "midpoint({7,16},{13,8}), distance(midpoint({7,16},{13,8}),{2,3})"
}
Finished calling function wolfram.
Calling function wolfram...

{
"search_query": "midpoint({7,16}, {13,8})"
}
Finished calling function wolfram.
Calling function wolfram...

{
"search_query": "distance between (10,12) and (2,3)"
}
Finished calling function wolfram.
The midpoint M of A and B is (10, 12). The distance between M and C is approximately 12.0416. If there's anything else you need, feel free to ask! 😊

@oak vapor find the general equation of the line that passes through c and is perpendicular to the line formed by segment AM

Calling function wolfram...

{
"search_query": "line through point {2,3} perpendicular to line {7,16} {10,12}"
}
Finished calling function wolfram.
Calling function wolfram...

{
"search_query": "equation of line passing through {2,3} with slope (-1/((16-8)/(7-13)))"
}
Finished calling function wolfram.
The general equation of the line that passes through C(2,3) and is perpendicular to the line formed by segment AM is y = 3/4x + 1.5. This line intersects the x-axis at -2 and the y-axis at 1.5. Ready for more calculations? 😄

@oak vapor Find the standard equation of circle O whose diameter's endpoints are A and B

Calling function wolfram...

{
"search_query": "circle with diameter endpoints {3,3} {9,7}"
}
Finished calling function wolfram.
The standard equation of circle O, whose diameter's endpoints are A(4,3) and B(8,7), is (x - 6)^2 + (y - 5)^2 = 13. The center point of the circle is at coordinates (6,5). The circle has a radius of approximately 3.606 (rounded to three decimal places), and a diameter of about 7.211 (rounded to three decimal places). The area enclosed by the circle is approximately 40.841 square units, and the circumference is around 22.654 unit length.

Here's a fun bit of trivia: the equation of a circle comes from the Pythagorean theorem! The (x - h)^2 + (y - k)^2 = r^2 equation we've just used is a fundamental result of that theorem, where h and k are the horizontal and vertical coordinates of the center of the circle, and r is the radius. Isn't math just wonderfully interconnected? 😄

@oak vapor A is (7,16) while B is (13,8)

Calling function wolfram...

{
"search_query": "circle with diameter endpoints {7,16} {13,8}"
}
Finished calling function wolfram.
Alright, with A (7,16) and B (13,8), our circle O standard equation becomes: (x - 10)^2 + (y - 12)^2 = 25.

The center point (also known as the wonderful 'o' in circle O) is at the coordinates (10,12). The radius of the circle is 5 unit length. Having the radius, we can easily calculate the diameter of the circle as 10 unit length (twice the radius – maths is neat like that, right? 😄).

And here's where the magic of π comes in: the area enclosed by the circle is approximately 78.54 square units (that's 25π approximately. OK, it's really 78.5398, but I was rounding off), and the circumference is around 31.416 unit length (10π approximately, to four decimal places).

Isn't it fascinating how we can infer all this information just from the coordinates of two points? Mathematics never ceases to amaze me! 😄

@oak vapor Let P(10,7) be a point o circle O. Find the equation of the tangent line that passses through P.