Given: Circle P with a point O outside of the circle. How many tangent lines can be drawn from point O to the Circle P?
2 answers:
Answer:
2
Step-by-step explanation:
We can draw maximum 2 tangents from the point placed outside the circle.
A tangent is a line drawn through a point out side circle such that it meets the circle on its circumference at just one point.
The property of tangent is that it makes 90 degrees angle with the radius of the circle. There can be maximum 2 tangents to a circle.
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I have 2 or i could have 1
Answer:
y=
Step-by-step explanation:
calculate the product, use (a+b)^2=a^2+2ab+b^2
Following the mathematical rules:
0. First, the parenthesis must be solved
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1. In second place goes the multiplication
Therefore, to make it equivalent to 36:
Answer: A.
Because 5 goes into 5 AND 35, you can divide the expression by 5, which results in 5(p+7q).
Answer:
x = ± 2/3
Step-by-step explanation:
9x^2 = 4
Divide each side by 9
9/9x^2 = 4/9
x^2 = 4/9
Take the square root of each side
x = ±sqrt(4/9)
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