Answer:
1.Intersecting segments theorem
In this scenario, two secant segments intersect each other inside the circle.The relationship is that the product of the segment pieces of one segment is equal to the product of the segment piece of the other.
Hint⇒identify the <u>corresponding segment pieces</u> for multiplication
2.Two secant segments that intersect outside circle
In this scenario the product of the whole secant with its external part is equal to the product of the other whole secant segment with its external part.
Hint ⇒identify the segment pieces <u>outside the circle</u> and the <u>whole segments</u> that include the external parts
3.One secant and one Tangent
In this case, the relation is that the product of whole segment with its external part is equal to square of the tangent segment.
Hint⇒ Identify <u>the tangent segment</u> and <u>the whole secant segment </u>that has an external part.
Hope this Helps.
1.01011 is non repeating
2.23232323 is repeating (the bar on top of the 23)
3.42666666 is repeating ( the bar on top of the 6)
4.321321321 is repeating since 321321321 is repeating with the dots
What is the interquartile for this problem <br><br>
18,19,22,22,25,25,26,31,32,34,37,37,37
koban [17]
Usually your interquartile would be your 50th percentile but in this case i have no clue
Answer:
Nice.
Step-by-step explanation:
Use SSA to answer. What would your answer be?
