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Test your basic knowledge |
SAT Math Level 2 Subject Test
Start Test
Study First
Subjects
:
sat
,
math
Instructions:
Answer 50 questions in 15 minutes.
If you are not ready to take this test, you can
study here
.
Match each statement with the correct term.
Don't refresh. All questions and answers are randomly picked and ordered every time you load a test.
This is a study tool. The 3 wrong answers for each question are randomly chosen from answers to other questions. So, you might find at times the answers obvious, but you will see it re-enforces your understanding as you take the test each time.
1. translate 4 units up
F(x)+4
(x-h)^2/a^2+(y-k)^2/b^2=1
x values
R is a zero of the polynomial p(x) if and only if x-r is a divisior of p(x)
2. periods of sin - cos tan
1 - square root of 3 - 2
Divisors or constant term/divisors of leading coefficient
Sin an dcos 2pi - tan is pi
x^ (a+b)
3. y intercept with general equation
Sinx
2cos^2x-1
-c/b
Tanx
4. axis of symmetry of parabola
2cos^2x-1
-a/b
If polynomial p(x) is divided by x-r then the remainder is p(r)
x=-b/2a
5. function
3-2i
Reflected across line y=x
x^ (a+b)
Each x value only has one y
6. 1+tanx^2
Secx^2
Reflected across line y=x
Cscx
(y-k)^2=4p(x-h) p>0 opens rt.
7. sin(pi/2-x)
Cosx
x^ (a+b)
F(-x)=f(x) x -y -x -y symmetric across y axis
F(-x)=-f(x) - x -y -x --y - symmetric with respect to the origin
8. (x^a)^b
If polynomial p(x) is divided by x-r then the remainder is p(r)
2a - 2b
F(-x)=f(x) x -y -x -y symmetric across y axis
x^ab
9. general form of trig - a is
Ax+by+c=0
Amplitude
F(x)-g(x)
1/(x^a)
10. x^a * x^b
Odd
x^ (a+b)
If polynomial p(x) is divided by x-r then the remainder is p(r)
Cosx
11. f^-1
Inverse
F(-x)=f(x) x -y -x -y symmetric across y axis
Equal to number of sign changes between terms or less than that number by an even integer
Distance from parabola to the focus and directrix
12. (fog)(x)
F(g(x))
2(sinx)(cosx)
P
2cos^2x-1
13. Sin2x
2(sinx)(cosx)
-b/2a - c-(b^2/2a)
Even
x^ (a+b)
14. b^(log base b of p)
P
(x-h)/a^2-(y-k)^2/b^2=1
Cscx^2
Even
15. area of tri
Cosx
Amplitude
Inverse
.5bcsina
16. general form of trig - b is
-a/b
Set of ordered pairs
2a - 2b
Normal per of f/b =period
17. sum of odd functions
C=square root of (a^2-b^2)
x^ (a-b)
Odd
-b/2a
18. parabola with x orientation
F(x-4)
Divisors or constant term/divisors of leading coefficient
3-2i
(y-k)^2=4p(x-h) p>0 opens rt.
19. odd function
F(-x)=-f(x) - x -y -x --y - symmetric with respect to the origin
Ax^2+bx+c=y
Cos^2x-Sin^2x
1
20. (fg)(x)
Cos^2x-Sin^2x
F(x)*g(x)
Reflected across line y=x
x^ (a-b)
21. f(x)*f(x)^-1
Ax^2+bx+c=y
Sinx
x
Cscx
22. ellipse major/minor axis
1 -1 - square root of 2
Opp direction
2a - 2b
.5bcsina
23. even function
Sin an dcos 2pi - tan is pi
Even
F(-x)=f(x) x -y -x -y symmetric across y axis
-c/b
24. Sec^2x
F(-x)=-f(x) - x -y -x --y - symmetric with respect to the origin
C=square root of (a^2-b^2)
1/(x^a)
1+tan^2x
25. sec(pi/2-x)
Cscx
Tanx
Normal per of f/b =period
y values
26. 2.) Cos2x
2cos^2x-1
Odd
y values
2(sinx)(cosx)
27. translate 4 units to right
1/(x^a)
Opens up
F(x-4)
x^ab
28. (f+g)(x)
(x-h)/a^2-(y-k)^2/b^2=1
x values
2cos^2x-1
F(x)+g(x)
29. number of positive real zeros of polynomial p(x)
Equal to number of sign changes between terms or less than that number by an even integer
F(x)+4
False
Cosx
30. vertex of parabola
Amplitude
Cosx
-b/2a - c-(b^2/2a)
Normal per of f/b =period
31. cos(90-x)
Opens up
Sinx
P
(x-h)^2/a^2+(y-k)^2/b^2=1
32. domain
1 -1 - square root of 2
Cos^2x-Sin^2x
x values
Tanx
33. 1.) Cos2x
F(-x)=-f(x) - x -y -x --y - symmetric with respect to the origin
Cos^2x-Sin^2x
F(x)+4
Ax+by+c=0
34. sum of even functions
Distance from parabola to the focus and directrix
1 - square root of 3 - 2
Even
x^ (a+b)
35. for quad - a<0
1
Ax+by+c=0
Distance from parabola to the focus and directrix
Opens down
36. is r a zero of a polynomial?
-c/b
R is a zero of the polynomial p(x) if and only if x-r is a divisior of p(x)
-b/2a - c-(b^2/2a)
(y-k)^2=4p(x-h) p>0 opens rt.
37. 3.) Cos2x
Secx^2
1-2sin^2x
Log(baseb)p + log(baseb)g
Sin an dcos 2pi - tan is pi
38. x^0
F(x-4)
1
F(x)-g(x)
1-2sin^2x
39. odd function ends
(x-h)/a^2-(y-k)^2/b^2=1
y values
Opp direction
F(-x)=f(x) x -y -x -y symmetric across y axis
40. ellipse distance to focus
1-2sin^2x
Distance from parabola to the focus and directrix
1 - square root of 3 - 2
C=square root of (a^2-b^2)
41. What are the rational zeros of p(x)?
False
Log(baseb)p- log(baseb)g
C=square root of a^+b^2
Divisors or constant term/divisors of leading coefficient
42. even funtion ends
Same direction
F(x)*g(x)
Amplitude
x^ab
43. phase shift - general form of trig
-c/b
y-k=+-(b/a)(x-h)
y values
R is a zero of the polynomial p(x) if and only if x-r is a divisior of p(x)
44. What is the remainer of P(x) divided by (x-r)?
.5bcsina
F(x)-g(x)
Even
If polynomial p(x) is divided by x-r then the remainder is p(r)
45. sinx^2+cosx^2
Opens up
1
C=square root of (a^2-b^2)
2(sinx)(cosx)
46. csc(90-x)
Ax+by+c=0
.5bcsina
Opens down
Secx
47. ellipse x orientation
Cos^2x-Sin^2x
(x-h)^2/a^2+(y-k)^2/b^2=1
Set of ordered pairs
-c/b
48. (f/g)(x)
x^ab
Normal per of f/b =period
(xy)^a
F(x)/g(x)
49. tan(pi/2-x)
-a/b
Cotx
y values
x
50. hyperbola with x orientation - opens to sides
Amplitude
Inverse
(x-h)/a^2-(y-k)^2/b^2=1
(y-k)^2=4p(x-h) p>0 opens rt.
