GBML MEET 2 Jeopardy Template

GBML Conventions + Arithmetic

Simultaneous Linear Equations and Word Problems + Matrices

Angles and Triangles

Quadratics

Trigonometric Equations

100

Can you put a "?" next to any of your answers?

No.

100

How do you find the determinant of this 2x2 matrix?

[ a b ]

[ c d ]

ad-bc

100

What is a centroid and what is the Centroid Theorem?

1. The point where all the medians of a triangle intersect

2.The centroid splits all medians in the ratio of 2:1.

100

Name and describe the 3 forms of a quadratic equation

Standard: y = ax² + bx + c

Factored: y = a(x-r₁)(x-r₂)

Vertex: y = a(x-h)² + k

100

Name all of the trig functions and their right triangle definitions.

Sin = opposite/hypotenuse

Cos = adjacent/hypotenuse

Tan = opp/adj

Cot = adj/opp

Sec = hyp/adj

Csc = hyp/opp

200

The solutions to x² + 2x = 0 are x=0 and x=2. How do you write this as your answer?

x=0, x=2

200

How do you multiply these 2x2 matrices?

[ a b ] [ e f ]

[ c d ] [ g h ]

[ ae+bg af+bh ]

[ ce+dg cf+dh ]

200

How many degrees are in each angle of a polygon with n sides?

180(n-2)/n

200

What are Vieta's Formulas?

In quadratic equation ax² + bx +c = 0, the sum of the roots is -b/a, and the product of the roots is c/a.

200

sin²x + cos²x = ?

300

Consider the infinite set of integers {2 * 3 * 4 * 5, 3 * 4 * 5* 6, 4 * 5 * 6 * 7, ..., n * (n+1) * (n+2) * (n+3)}. Compute the greatest common factor for this set of integers.

300

George's age is three times the age of his daughter Marah. In five years, the ratio of their ages will be 5:2. Compute Marah's current age.

300

The supplement of the complement of ∠ABC measures 152°. Compute m∠ABC in degrees.

300

For some integer b, one factor of 5x² + bx - 80 is x + 8. Compute b.

300

Name 3 different ways to define cos(2x)

2cos²x - 1

cos²x - sin²x

1 - 2sin²x

400

Let A, B, and C be three numbers such that A = 2√38, B = (√1351)/3, and C = √486 - √96. Arrange the three numbers from least to greatest.

C < B < A

400

1234x + 923y = 301

784x + 1095y = 1717

Find x.

-2

400

In Triangle △QUA, D is the midpoint of QA. Given that QA = 18, DU = 9, and QU = 10, compute AU.

4√14

400

Suppose that i = √-1. Given that -3 + i is a root of x³ + cx - 90 = 0 for some integer c, compute c.

-26

400

Solve on the interval 0 ≤ x < 360°: sin²x + 3cos²x = 1

x = 90°, x = 270°

500

Compute the least positive integer N such that √(6! * 7! * N) is a perfect square.

8575

500

Find A^-1 (the inverse of this matrix) if A =

[ a b ]

[ c d ]

[Show on board]

500

Point C is the centroid of equilateral triangle PQR. Compute the perimeter of △PQR, if the perimeter and area of △CQR are numerically equal.

12(2+√3)

500

A 30-inch piece of wirer is cut into two pieces. One piece is bent to form a square and the other piece is bent to form an isosceles right triangle. Given that the area of the square is equal to the area of the isosceles right triangle, compute the length of a leg of the isosceles right triangle in the form (a√2 - b)/c, where a, b, and c are positive, relatively prime integers.

(45√2 - 30)/7

500

Given that 1/(1-cos²x) = 2022, compute cos(2x).

1010/1011