I’m pretty sure that the answer is D
Answer:
Step-by-step explanation:
15. (x + 6)(x + 1)
16. (m - 19)(m + 2)
17. (y - 8)(y - 2)
18. (p + 12)(p - 3)
19. (c - 15)(c + 3)
20. (w - 8)^2
21. (a + 15)(a - 2)
22. (x - 30)(x + 3)
23. 3(5r + 4)(5r - 4)
24. 5(3x - 1)(3x + 1)
25. m^2n(1 - n)(1 + n)
26. 6a(a - 2b)(a + 2b)
27. 3(x^2 + 5x - 24)
3(x + 8)(x - 3)
28. 2(m - 1)^2
29. x(x^2 + 9x - 52)
x(x+13)(x-4)
30. 4y(y^2+y-30)
4y(y+6)(y-5)
Since the new test score is 95 and that’s better than the previous max score, this new score will not impact the min value.
Since no one previously had scored that high, then the mode will also not change.
The range definitely changes, this is the new max value (so that changed), the mean will change with a new top score.
Since this is a new top score, the median will LIKELY change, but I think you could construct a situation where the median score doesn’t change. But that would be an unusual situation.
Answer:
Step-by-step explanation:
Let us begin with the AA Similarity definition. It states that if two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar.
This means that we need:
- An angle of one triangle that is congruent to an angle of the other triangle.
- Another angle of one triangle that is congruent to another angle of the other triangle.
For this problem, it is unclear that there are more than one angles that are congruent to each other. We see that angle <DEF and <ABC are congruent, but the problem does not give any other angles. In another case, we must find one more to prove similarity by the AA similarity theorem.