Problem : A basketball is dropped from a height of 200cm. It bounces on a solid surface to a height that can be expressed as half the drop height divided.

Slides:

Advertisements

Similar presentations

Advertisements

Manipulated Vs. Responding Variable

By :Gilbert Fulton.  I hypothesize that the sand will have the most affect on the dropped ball.

SCIENCE JOURNAL 11/8/ st PAGE MY SCIENCE JOURNAL BY _________________.

Find the next two numbers in the pattern

Experiment 2 part 2 – Feedback and recap of Part 1 – Goals for this lab: Measure the bounce of the ball at different heights that are below table level.

Particle Impact: Ex Prob 3 (Ball on Surface) A ball is released from some height, h 1, and reaches a velocity v 1 just before striking the ground. The.

How do I find the surface area and volume of a sphere?

Do now: These cuboids are all made from 1 cm cubes

Scientific Method By: Pam Reid. Purpose  Is a statement about the objective of the experiment.  Example: To determine if a basketball will bounce higher.

9-1 Geometric Sequences Warm Up Lesson Presentation Lesson Quiz

Calculating the area of a TRIGLE AN.

Algebra 1 Find the common ratio of each sequence. a. 3, –15, 75, –375,... 3–1575–375  (–5)  (–5)  (–5) The common ratio is –5. b. 3, ,,,...

Sequences & Series Jeopardy Pythagora s Gauss Descart es Fibonacc i Fermat

Significant Digits. Rules for Significant Digits.

Many games depend on how a ball bounces. For example, if different basketballs rebounded differently, one basketball would bounce differently off of a.

6cm 1) Find the area of this circle: A)28.3cm² B)113.1cm² C) 37.7cm² D) 18.8 cm² 6cm A)28.3cm² B)113.1cm² C) 37.7cm² D) 18.8 cm².

5 CM 4 CM Calculation Area = Length times Width (lw or l x W) Note Length of a rectangle is always the longest side.

ENLARGEMENT Scale factors Centre of enlargement Scale factors Indicates how much to enlarge or reduce the original. Formula = image length divided by.

BY: Bryan Hathaway. The Field Math concepts  Shot Speed  Position of a shot  Bounce shot.

Warm up Notes Preliminary Activity Activit y For Fun Surface area of a cylinder.

Chapter 4 Section 5.B Solving Quadratics by Finding Square Roots In this assignment, you will be able to... 1.Solve a quadratic equation. 2. Model a dropped.

VOLUME OF SOLIDS. VOLUME OF PRISMS V = Area of Base x Height V = 6 cm 8 cm 10 cm All measurements must be in the same UNIT before doing ANY calculations.

HANDS-ON ACTIVITY: BOUNCING BALLS CONTRIBUTED BY: INTEGRATED TEACHING AND LEARNING PROGRAM AND LABORATORY, UNIVERSITY OF COLORADO AT BOULDER.

1. √49 2. –√144 Lesson 4.5, For use with pages

Chapter 8: Exponents & Exponential Functions 8.6 Geometric Sequences.

Observation: Brad and Sara were playing at recess with the same type of ball. Brad noticed that when Sara bounced the ball close to the ground, it didn’t.

Warm Up In the Practice Workbook… Practice 8-8 (p. 110) # 4 a – d.

By: Hanna Briestensky Problem Determine how the height from which the ball is dropped, effects how high that the ball will bounce back up.

9.1 Part 1 Sequences and Series.

Multiplying a Fraction and a Whole Number November

1. 2 Get a rectangular piece of paper and cut it diagonally as shown below. You will obtain two triangles with each triangle having half the area of the.

Bouncy Task Task 1Task 2Task 3Task 4 Task 5Task 6Task 7 NC Level 5 to 7.

What is the graph about? Is it linear? AMSTI-Bouncing Balls.

Ball and ramp controlled study Group #5. How does the release distance affect the bounce distance of a golf ball from bounce one to bounce two?

Science and Mathematics Assignment ‘Bouncing Ball’ Term

The Super Ball Project. QUESTION Does a surface effect the bounce of a super ball?

Math 20-1 Chapter 1 Sequences and Series

Time to take your medicine! A patient is prescribed a 250 mg dose of an antibiotic to be taken every 8 hours for 3 days. The drug is both excreted and.

Maths/Science Assignments “bouncing balls” AN EXTENSION ASSIGNMENT BY KIRAN GIRITHARAN.

By: Will Schubert. Determine how the height you drop a ball from affects the height the ball bounces back up. Problem.

Warm-Up #1 11/30 1. Write down these 3 formulas:

Title: By:. Experimental Design Problem- What is the effect of ___________ on the ____________________________? IV: Levels of the IV [Put your Control.

Data Acquisition and Analysis The Big Idea The use of instruments to gather data can help us understand the impacts of technology systems.

Name the next number in the sequence: a) 1, 3, 9, 27, … b) 1, 5, 25, 125, …

11-1 Mathematical Patterns Hubarth Algebra II. a. Start with a square with sides 1 unit long. On the right side, add on a square of the same size. Continue.

1.2 Mathematical Patterns Warm-up Page 11 #13 How are expressions written and graphed for arithmetic patterns?

Holt McDougal Algebra Geometric Sequences Warm Up Find the value of each expression –5 3. – (–3) (0.2) (–4) 2 –81.

Bouncing Bayer Ball uDu WARNING! Don’t be a reptile! Butyl ButadieneStyrene-butadiene PolyneoprenePolynorbornene.

Section 5 Absolute Value Equations and Inequalities

Writing Algebraic Expressions to Solve Word Problems.

Dimensional Analysis.

3. Convergent Series & Compound Interest

Homework: Part I Find the next three terms in each geometric sequence.

EXAMPLE 1 Find the volume of a solid Find the volume of the solid. a.

Find the common difference of each sequence.

Volume of solids.

Warm-up The base length is 30 cm.

Withrow University High School May 2008

Walk In… Take out notebook

Chapter Rebound Ratios.

Complete the following calculation:

Starter Questions Calculate the area of the following shapes :- a. 4m

Measurement Rounding.

Starter Questions Calculate the area of the following shapes :- a. 12m

Complete the following calculation:

Lesson 4.8 Core Focus on Geometry Volume of Spheres.

Lesson 4.8 Core Focus on Geometry Volume of Spheres.

Math 20-1 Chapter 1 Sequences and Series

Presentation transcript:

Problem : A basketball is dropped from a height of 200cm. It bounces on a solid surface to a height that can be expressed as half the drop height divided by 2. What is the final bounce height? Answer: Final bounce height= 200÷2= 100cm. 200cm 100cm

PROBLEM B Problem : Calculate what the bounce height will be if the ball is dropped from half the original height in the previous question Answer: Half original drop height = 200÷2=100=bounce drop height. Final bounce height= 100÷2=50cm 100cm 50cm Problem : Calculate what the bounce height will be if the ball is dropped from half the original height in the previous question. Answer: Half original drop height = 200÷2=100=bounce drop height. Final bounce height= 100÷2= 50cm.

Problem : A super bouncy was recently advertised as being able to bounce very high. After dropping it from a height of 25 meters the ball lost only 25% of itsstarting height. To what height did the ball bounce? Answer: 25÷4=6r1= = m 18.9m

Problem : If a super bouncy ball loses 50% of its start height on every bounce, how many bounces will it take before it bounces less than a centimetre? Answer: go to next page

6.25cm 50cm 25cm 12.5cm 100cm 3.125cm cm

THANK YOU FOR WATCHING