38 th Annual Lee Webb Math Field Day Varsity Math Bowl.

Slides:

Advertisements

Similar presentations

solved problems on optimization

Advertisements

MAT 105 SPRING 2009 Chapter 2 Geometry.

The distance is 6. I’m looking for a distance of 3. Wrong answer.

2010 Lee Webb Math Field Day March 13, 2010 Junior Varsity Math Bowl.

39 th Annual Lee Webb Math Field Day March 13, 2010 Varsity Math Bowl.

2009 Lee Webb Math Field Day Junior Varsity Math Bowl.

40th Annual Lee Webb Math Field Day MARCH 12, 2011 Junior Varsity Math Bowl.

Rules of Engagement Please turn off all cell phones while Math Bowl is in progress. The students participating in Rounds 1 & 2 will act as checkers for.

Rules of Engagement Please turn off all cell phones while Math Bowl is in progress. The students participating in Rounds 1 & 2 will act as checkers for.

40 th Annual Lee Webb Math Field Day March 12, 2011 Varsity Math Bowl.

Divide the class into three groups and have each group choose one person who will answer questions on behalf of the whole group. Have each group take.

Mr. Barra Take The Quiz! Polygon with three edges (sides) and three vertices (corners) Sum of all interior angles equals 180° Right triangle One interior.

©A. Weinberg By Ms. Weinberg SOL ©A. Weinberg Let’s learn a bit about Geometry! Geometry is a part of Math that focuses on shapes and lines. Shapes.

Jungle Geometry Jonesboro, GA Website:

Notes for the 3 rd Grading Period Mrs. Neal 6 th Advanced & 7 th Average.

Solve for x. 30° 2x x + 10 = 60 – 10 – 10 2x = x = 25.

Expressions & Integers Geometry Percents Interest Rational Numbers Equations Inequalities Proportions Probability 300.

Warm Up Write down objective and homework in agenda Lay out homework (Distance & PT worksheet) Homework (Volume worksheet) Get a calculator!!!

MATHCOUNTS  2005 School Competition Countdown Round.

M C S E A Rules for Team Competition Answer all parts of a question THEN… Hold up your 1 st attempt so order recorders can see your team number.

MATHCOUNTS Countdown Round.

Equation A statement that two mathematical expressions are equal.

TechConnect Concrete Math.

Slide 1-1 By Y. Ath. Slide 1-2 Section 1 Angles Slide 1-3 Basic Terminology Line AB. Line segment AB Ray AB.

Click when ready... Team round This round will last for approximately 2 hours. There will be no break. If you wish to leave for a toilet break or to.

32 nd Annual Armstrong Atlantic State University High School Math Tournament Ciphering Round.

Write the standard number 38,440 in scientific notation. A × 10 6 B × 10 3 C × 10 4 D ×

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 4 Trigonometric Functions.

R ADICAL E XPRESSIONS AND EQUATIONS Chapter 11. INTRODUCTION We will look at various properties that are used to simplify radical expressions. We will.

Acute angle An angle with a measure less than 90 degrees.

Angles and Their Measure.

ET-314 Week 9. Basic Geometry - Perimeters Rectangles: P = 2 (L + W) Example: For a rectangle with length = 4 cm and width = 7 cm P = 2 (4 cm + 7 cm)

TechConnect Concrete TechConnect Concrete Math. Place Values.

Objective Apply formulas for perimeter, area, and circumference.

Praxis I Math Review By: Professor Peter Eley. Question 1 Text answers to A scientist has a very sophisticated microscope and laser cutting tool.

Section 7.1 Introduction to Rational Expressions Copyright © 2013, 2009, and 2005 Pearson Education, Inc.

Math Vocabulary Project By: J’amezz Martin. Integer A whole number; a number that is not a fraction.

Slide 9- 1 Copyright © 2006 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.

Objective: students will be able to understand the basics concepts of geometry and be able to apply them to real world problems.

I know that the answer in an addition problem is the: Sum.

RELATED RATES DERIVATIVES WITH RESPECT TO TIME. How do you take the derivative with respect to time when “time” is not a variable in the equation? Consider.

Complete each equation. 1. a 3 = a2 • a 2. b 7 = b6 • b

This is a new powerpoint. If you find any errors please let me know at

Copyright © Cengage Learning. All rights reserved. CHAPTER Right Triangle Trigonometry Right Triangle Trigonometry 2.

Page 292 HW Answers.

Algebra I and Algebra I Concepts Chapter 0. Section 0-2 Real Numbers Real Numbers Irrational Numbers Rational Numbers Integers Whole Natural.

Chapter 1: Variables and Patterns Chapter 1: Patterns and Variables Definition of a Pattern A list of numbers that follow a certain sequence or patterns.

SAT I Math Test #04 Solution. SAT I Math Test No. 04 SECTION 1 BE = BC + CE, where BC = √( ) = √100 = 10 and CE = √(13 2 – 12 2 ) = √25 = 5 ∴

Mathematical Vocabulary

Chapter 11 Areas of Plane Figures Understand what is meant by the area of a polygon. Know and use the formulas for the areas of plane figures. Work geometric.

Circumference and Area of Circles Section 8.7. Goal Find the circumference and area of circles.

Slide Copyright © 2009 Pearson Education, Inc. MM150 Unit Six Seminar Professor DeLong profsdelong (AIM name) Gosh, I love geometry… let’s get started!!!

Chapter 5 – The Trigonometric Functions. 5.1 Angles and Their Measure What is the Initial Side? And Terminal Side? What are radians compared to degrees?

Holt Geometry 1-5 Using Formulas in Geometry Warm Up Evaluate. Round to the nearest hundredth () 6. (3) 2.

Holt McDougal Geometry 1-5 Using Formulas in Geometry 1-5 Using Formulas in Geometry Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation.

A tangram is an ancient Chinese puzzle made from a square. The pieces can be rearranged to form many different shapes. The area of a figure made with.

Copyright © 2011 Pearson Education, Inc. Conic Sections CHAPTER 13.1Parabolas and Circles 13.2Ellipses and Hyperbolas 13.3Nonlinear Systems of Equations.

1A B C1A B C 2A B C2A B C 3A B C3A B C 4A B C4A B C 5A B C5A B C 6A B C6A B C 7A B C7A B C 8A B C8A B C 9A B C9A B C 10 AA B CBC 11 AA B CBC 12 AA B CBC.

Chapter 11 Areas of Plane Figures

5.1 The Unit Circle.

SOLVING ALGEBRAIC EXPRESSIONS

John O’Bryan Mathematics Contest

State Countdown Round MATHCOUNTS State Countdown Round.

4TH QUARTER SY MATH BELL RINGERS

Grissom High School Math Tournament 2007

Alabama School of Fine Arts

LESSON 4–2 Degrees and Radians.

Presentation transcript:

38 th Annual Lee Webb Math Field Day Varsity Math Bowl

Before We Begin: Please turn off all cell phones while Math Bowl is in progress. The students participating in Rounds 1 & 2 will act as checkers for one another, as will the students participating in Rounds 3 & 4. There is to be no talking among the students on stage once the round has begun.

Answers that are turned in by the checkers are examined at the scorekeepers’ table. An answer that is incorrect or in unacceptable form will be subject to a penalty. Points will be deducted from the team score according to how many points would have been received if the answer were correct (5 points will be deducted for an incorrect first place answer, 3 for second, etc.).

Correct solutions not placed in the given answer space are not correct answers! Rationalize all denominators. Reduce all fractions. Do not leave fractions as complex fractions. FOA stands for “form of answer”. This will appear at the bottom of some questions. Your answer should be written in this form.

2009 Math Bowl Varsity Round 1

Practice Problem – 10 seconds What is the area of a circle of radius ?

Problem 1.1 – 30 seconds Find the ordered triple that satisfies the system FOA: (a,b,c)

Problem 1.2 – 30 seconds Several cannon balls are stacked in six layers, so that there is a 6x6 square on the bottom, with a 5x5 layer above that, etc. How many cannon balls are there?

Problem 1.3 – 30 seconds Let and. Evaluate.

Problem 1.4 – 30 seconds Determine Answer in radians..

Problem 1.5 – 75 seconds Square ABCD has area 16. E and F are on sides BC and CD such that AE and AF trisect the corner at A. What is the area of quadrilateral AECF? FOA:

Problem 1.6 – 15 seconds Write as a simple trigonometric function.

Problem 1.7 – 60 seconds The x-y, y-z, and z-x planes cut the sphere into 8 parts. What is the volume of one of these parts?

Problem 1.8 – 45 seconds A CD player changes the speed of the disc in order to read the encoded bits at the same rate. If the disc spins at 250 rpm for a track that is 60 mm from the center, how many rpm are required for another track that is 20 mm from the center?

Problem 1.9 – 45 seconds Find the real part of

Problem 1.10 – 45 seconds Consider the sequence of digits What is the 100 th digit?

Problem 1.11 – 30 seconds Solve for y :

Problem 1.12 – 30 seconds What is the principal value of

Round 2

Problem 2.1 – 15 seconds Simplify

Problem 2.2 – 30 seconds An angle is reported to be In decimal notation, this is how many degrees?

Problem 2.3 – 30 seconds Let. Find.

Problem 2.4 – 30 seconds Find the exact value of.

Problem 2.5 – 15 seconds Find an expression for

Problem 2.6 – 30 seconds For the following parabola, how far is the focus from the vertex?

Problem 2.7 – 60 seconds Solve for k:

Problem 2.8 – 15 seconds Fill in the blank: The orthocenter of a triangle is the intersection of its ___________.

Problem 2.9 – 60 seconds Jane and Carlos and their guests had pie for dessert. They used a special pie-cutter that cuts central angles of any integer degree. Everyone got exactly one piece of pie of exactly the same size. How many possibilities are there for the number of guests (do not count the 0 guest case)?

Problem 2.10 – 75 seconds Joey clothes-pinned a card on the front wheel of his bicycle. The card clicks every time a spoke strikes it. The wheel is 24” in diameter and has 32 spokes. If Joey rides 11 ft per second, how many clicks are there per second? Round off to the nearest integer.

Problem 2.11 – 30 seconds Simplify:

Problem 2.12 – 45 seconds Let. Put the following in increasing order FOA: a,b,c,d (e.g)

Round 3

Practice Problem – 30 seconds Simplify

Problem 3.1 – 45 seconds The area of an equilateral triangle varies directly with the square of the length of a side. Find the constant of proportionality.

Problem 3.2 – 30 seconds Find the value of such that the expression is minimal.

Problem 3.3 – 60 seconds Calculate FOA: fraction in lowest terms

Problem 3.4 – 60 seconds A polyhedron has 24 vertices. Two regular hexagons and one square meet at each vertex. In all there are 8 hexagons. How many squares are there?

Problem 3.5 – 30 seconds In the polyhedron of the previous problem, there are 24 vertices, 8 hexagonal faces, and 6 square faces. How many edges does the polyhedron have?

Problem 3.6 – 30 seconds Solve for x:

Problem 3.7 – 60 seconds How many points with integer coordinates satisfy

Problem 3.8 – 30 seconds The sum of the infinite series is equal to for what polynomial ?

Problem 3.9 – 60 seconds Zacky’s Pizzeria offers a choice of 3 different sizes, 2 different kinds of crusts, and 10 different kinds of toppings. How many different pizzas can be ordered (with at least one topping)?

Problem 3.10 – 30 seconds A rhombus has side length 10 and area 50. What is the measure, in radians, of its smallest angle?

Problem 3.11 – 60 seconds The light in a lighthouse makes 10 revolutions per minute. How fast does the light flash by on the side of a boat that is 600 feet directly offshore? Answer in feet per second in terms of

Problem 3.12 – 60 seconds Suppose T1, T2, T3, … is an infinite sequence of similar triangles. The perimeter of each triangle is 80% as much as the previous triangle. If the area of the first triangle is 63, find the sum of the areas of all the triangles.

Round 4

Problem 4.1 – 60 seconds Find the first five digits after the decimal point of the following rational number:

Problem 4.2 – 45 seconds A gum manufacturer randomly puts a coupon in 1 of every 4 packages. What is the probability of getting at least one coupon if 4 packages are purchased?

Problem 4.3 – 60 seconds A triangle has vertices at (3,4), (6,9), and (11,2). What is its area?

Problem 4.4 – 45 seconds A rectangle of length 36 and height 6 is centered at the origin. What is the equation of the circle that goes through all the vertices of the rectangle?

Problem 4.5 – 30 seconds If you draw two cards randomly from a standard deck, what is the probability that you get two of a kind (2 kings or 2 sevens, etc)?

Problem 4.6 – 15 seconds Which letter of the Greek alphabet is ? FOA: 1 st, 2 nd, or 3 rd etc.?

Problem 4.7 – 45 seconds Evaluate:

Problem 4.8 – 45 seconds Let be a complex number such that Find

Problem 4.9 – 60 seconds It takes 7 days for 5 chickens to lay 2 dozen eggs. How many days will it take 21 chickens to lay 30 dozen eggs?

Problem 4.10 – 30 seconds Randy and forty-four other people are situated in a circle. Randy passes a soccer ball to the twelfth person on his right. This is repeated until the ball comes back to Randy. How many people do not touch the ball?

Problem 4.11 – 60 seconds is the best rational approximation to that has denominator less than 10. It is accurate to 2 places. There is another approximation with denominator 113 that is accurate to 6 places. Find its numerator.

Problem 4.12 – 60 seconds Let be the number of points in the 1 st quadrant with integer coordinates whose distance back to the origin is less than. Determine