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Serious answers only. Do not answer if you dont know please!How does the graph of the circle described by x^2 + (y-7)^2 = 49 change when its equation is changed to (x +5)^2 + (y-4)^2 =64. Select each correct answer. The circles radious increases, The circle moves up, The circle moves left, The circles radious decreases, The circle moves down, The circle movea right.

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veronicaculs

Answer:

  • The circles radious increases
  • The circles moves left
  • The circles moves down

Step-by-step explanation:

  • The equation of a circle can be written as [tex](x-a)^2+(y-b)^2=r^2[/tex], where "r" is the radious, and (a,b) are the coordenates in the axis x and b respectively.
  • Then, in the first circle the coordenates are (0,7), which means that the circle will be center there, and the radious is 7 ([tex]\sqrt{49}[/tex]).
  • The second circle have different coordenates: (-5,4), which means that the circle has moved left (from 0  to -7 in the x axis) and down (from 7 to 4 in the y axis). Additionally, its radious has increased from 7 ([tex]\sqrt{49}[/tex], from 8 ([tex]\sqrt{64}[/tex]).
  • See the attached figure please.
  • Then, the correct answers are:
  1. The circles radious increases (from r=7 to r=8)
  2. The circles moves left (from x=0 to x=-5)
  3. The circles moves down (from y=7 to y=4)
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