Pre-Cal review part 2 Jeopardy Template

Ch 7-Analytic Trig

Ch 8-Applications of trig

Ch 9-Polar coordinates and vectors

Ch 12-Sequences

Ch 10-Analytic Geometry

100

Find the exact value of sin-1(√2 / 2)

π/4

100

Find the exact value without using a calculator: tan(20°) - cos(70°) / cos(20°)

Use the complement angle theorem to let cos(70°) = sin(90°-70°) = sin(20°)

100

The polar coordinates are given. Convert to rectangular: (7.5, 110°)

(-2.57, 7.05)

100

Find the sum: ∑(3k) from k=1 to 5

100

Find the vertex, directrix, and vertex: y^2 - 4y +4x +4 = 0

Directrix: x=1 Focus: (-1, 2) Vertex: (0, 2)

200

Find the exact value: sin-1[cos(-7π/6)]

-π/3

200

What is the law of sines?

SinA/a = sinB/b = sinC/c

200

What shape does this polar graph make? r=a+-bcosx or r=a+-bsinx

Limacon with inner loop.

200

Find the first term, common difference, and recursive for the arithmetic sequence: the 9th term is -5 and the 15th term is 31.

a1 = -53, d=6, an = a(n-1) + 6

200

Find the verticies, center, and foci of the ellipse: 4x^2 + y^2 + 4y = 0

Verticies: (0,-4),(0,0) Center: (0,-2) Foci: (0, -2-√3),(0,-2+√3)

300

Solve on 0

x = 3π/4, 7π/4

300

Solve the triangle: A=40°, B=40°, c=2(side)

C=100°, a~1.31, b~1.31

300

Graph: r=4sin(5x)

Rose with 5 petals.

300

Define an arithmetic sequence.

a1=a, an = a(n-1) + d

300

Find an equation for this ellipse. Center at (1,2), focus at (4,2), contains the point (1,3).

[ ( (x-1)^2 ) / 10 ] + (y-2)^2 = 1

400

Find the exact value: If tan(x)= -1/2 and 3π/2 < x < 2π , find sin(2x).

-4/5

400

Which triangle cases are solved by the law of cosines? (Hint: in reference to ASA, SAS, SAA, SSS, etc.)

SAS, SSS

400

What is De Moivre's theorem?

z^n = r^n[cos(nx)+isin(nx)]

400

Define: the nth term of a geometric sequence.

An = a1r^(n-1) r cannot equal zero.

400

Find an equation for the hyperbola: center at (4,-1), focus at (7,-1), and vertex at (6,-1)

[((x-4)^2) / 4] - [((y+1)^2) / 5] = 1

500

Establish the identity: cos^4(x) - sin^4(x) = cos(2x)

Cos(2x) = cos^2(x) - sin^2(x) and cos^4(x) - sin^4(x) can be simplified to (cos^2(x) - sin^2(x)) * (cos^2(x) + sin^2(x)) then you can divide the common terms to establish the identity.

500

Solve the triangle: a=10, b=8, c=5 (SSS)

A=97.9°, B=52.4°, C=29.7°

500

Write in the standard form a+bi: [√5 (cos(3π/16) + isin(3π/16)]^4

(- 25√2 / 2) + (25√2 / 2)(i)

500

Does the sequence converge or diverge? ∑5[(1/4)^k-1] from k=1 to infinity.

converges

500

Find the center, transverse axis, verticies, foci, and asymptotes of the hyperbola. [(y-2)^2] - 4[(x+2)^2] = 4

Center: (-2,2) Transverse Axis: parallel to the y-axis Verticies: (-2,0),(-2,4) Foci: (-2, 2-√5),(-2,2+√5) Asymptotes: y-2= ±2(x+2)