Now that I'm caught up with the current New York State Regents exams, I'm revisiting some older ones.
More Regents problems.
Algebra 2/Trigonometry Regents, January 2011
Part I: Each correct answer will receive 2 credits.
11. The conjugate of 7 − 5i is
1) −7 − 5i
2) −7 + 5i
3) 7 − 5i
4) 7 + 5i
Answer: 4) 7 + 5i
To find the conjugate of a complex number, change the sign of the imaginary part.
So the conjuage of 7 - 5i is 7 + 5i, which is Choice (4).
Similarly, the conjugate of the binomial (7x - 5y) is (7x + 5y).
12. If sin-1 (5/8) = A, then
1) sin A = 5/8
2) sin A = 8/5
3) cos A = 5/8
4) cos A = 8/5
Answer: 1) sin A = 5/8
Remember that sin(sin-1(5/8) = 5/8. Therefore,
sin-1 (5/8) = A
sin( sin-1 (5/8) ) = sin(A)
5/8 = sin A
That is Choice (1).
13. How many distinct triangles can be formed if m∠A = 35, a = 10, and
b = 13?
1) 1
2) 2
3) 3
4) 0
Answer: 2) 2
You are given two sides and an angle that is not included between those two sides. We learned in Geometry that there is no SSA Theorem because there are two possible triangles in this situation.
The exception to this rule is the Hypotenuse Leg Theorem. This triangle is a right triangle if and only if the sin 35 = 10/13, so check this.
sin 35 degrees = 0.573...
10/13 = 0.7692...
They are not the same, so the triangle is not right.
14. When 3/2 x2 − 1/4 x - 4 is subtracted from 5/2 x2 - 3/4 x + 1,
the difference is
1) -x2 + 1/2 x - 5
2) x2 - 1/2 x + 5
3) -x2 - x - 3
4) x2 - x - 3
Answer: 2) x2 - 1/2 x + 5
The "from" term goes first in the subtraction:
(5/2 x2 - 3/4 x + 1) - (3/2 x2 − 1/4 x - 4)
= 5/2 x2 - 3/2 x2 - 3/4 x - (-1/4 x) + 1 - (-4)
= 2/2 x2 - 2/4 x + 5
= x2 - 1/2 x + 5, which is Choice (2).
Note that you would've gotten choice (1) if you subtracted backwards.
15. The solution set of the inequality x2 − 3x > 10 is
1) {x | −2 < x < 5}
2) {x | 0 < x < 3}
3) {x | x < -2 or x > 5}
4) {x | x < -5 or x > 2}
Answer: 3) {x | x < -2 or x > 5}
Factor the inequality.
x2 − 3x > 10
x2 - 3x - 10 > 0
(x - 5)(x + 2) > 0
For the product to be positive, both binomials must be positive or both must be negative.
They are both positive is x > 5. They are both negative if x < -2. This is Choice (3).
More to come. Comments and questions welcome.
More Regents problems.
I also write Fiction!You can now preorder Devilish And Divine, edited by John L. French and Danielle Ackley-McPhail, which contains (among many, many others) three stories by me, Christopher J. Burke about those above us and from down below. Preorder the softcover or ebook at Amazon. Also, check out In A Flash 2020, by Christopher J. Burke for 20 great flash fiction stories, perfectly sized for your train rides. Available in softcover or ebook at Amazon. If you enjoy it, please consider leaving a rating or review on Amazon or on Good Reads. |
No comments:
Post a Comment