September 17 2010 DRILL A BOWLING PINS Ten
September 17, 2010 DRILL A: BOWLING PINS Ten bowling pins form a triangular arrangement. Move 3 pins so that the resulting triangle points in the opposite direction. DRILL B: CROSSING CLOCK HANDS On a regular clock, how many times will the minute hand hour hand cross each other between the hours of 10 a. m. and 2 p. m. ? IOT I 1 -11 POLY ENGINEERING
DRILL A: BOWLING PINS - SOLUTION Ten bowling pins form a triangular arrangement. Move 3 pins so that the resulting triangle points in the opposite direction. IOT I 1 -11 POLY ENGINEERING
DRILL B: CROSSING CLOCK HANDS - SOLUTION On a regular clock, how many times will the minute hand hour hand cross each other between the hours of 10 a. m. and 2 p. m. ? 1. Between 10: 54 and 10: 55 a. m. 2. At 12: 00 noon 3. Between 1: 05 and 1: 06 p. m. IOT I 1 -11 POLY ENGINEERING
PROBLEM #4 : YESTERDAY’S WORKSHEET Given a stack of individual blocks as shown. If all of the visible blocks were to disappear suddenly, how many blocks would remain? Write down your answer. IOT I 1 -11 POLY ENGINEERING
PROBLEM #4 : HOMEWORK SOLUTION (MODEL) 3 + 8 + There are 17 blocks left. 6 = 17 IOT I 1 -11 POLY ENGINEERING
PROBLEM #5 : YESTERDAY’S WORKSHEET Draw the following figure in one continuous action without lifting your pencil off the paper and without crossing any lines. You may begin at any point. IOT I 1 -11 POLY ENGINEERING
PROBLEM #5 (CROSSING PATHS) : SOL’N Draw the following figure in one continuous action without lifting your pencil off the paper and without crossing any lines. You may begin at any point. IOT I 1 -11 POLY ENGINEERING
PROBLEM #1 (COUNTERFEIT GOLD COIN): A man is given 9 gold coins, but one of them is counterfeit and weighs less than the others. The man wants to determine which of the coins is counterfeit by using his balance scale. How can the man determine the false coin with only two uses of the balance scale? Write down your answer. IOT I 1 -11 POLY ENGINEERING
PROBLEM #1 COUNTERFEIT GOLD COIN FLOWCHART SOLUTION: Divide the 9 gold coins into three equal groups of 3 coins each. Call them A, B, and C. A B C Place A and B on each side of the balance. Leave C on the table. This is the first use of the balance. IOT I 1 -11 POLY ENGINEERING
PROBLEM #1 COUNTERFEIT GOLD COIN FLOWCHART SOLUTION: Did A and B balance? YES The light coin is in group C. NO Discard the heavy group. Keep the light group. One light group has been identified with one weighing. Next, we determine which of those 3 coins is lightest. I 1 -11 IOT POLY ENGINEERING
PROBLEM #1 COUNTERFEIT GOLD COIN FLOWCHART SOLUTION: Divide the 3 gold coins into three equal groups of 1 coin each. Call them D, E, and F. D E F Place D and E on each side of the balance. Leave F on the table. This is the second use of the balance. IOT I 1 -11 POLY ENGINEERING
PROBLEM #1 COUNTERFEIT GOLD COIN FLOWCHART SOLUTION: Did D and E balance? YES The counterfeit coin is F. NO The lighter coin is counterfeit. In summary, the first weighing eliminated 2 groups of 3 coins each. The second weighing eliminated 2 of the last 3 coins. I 1 -11 IOT POLY ENGINEERING
PROBLEM #2 (AVERAGE SPEED): A train travels up a steep hill at a constant speed of 25 miles per hour. It takes one hour to reach the top of the hill. Neglecting the very small time it takes to turn around, how fast would the train have to travel down the hill in order for the average speed to be 50 mph for the entire round-trip? IOT I 1 -11 POLY ENGINEERING
PROBLEM #2 (AVERAGE SPEED): SOLUTION The traveled 25 mph forisone to reach the The train return trip down the hill alsohour 25 miles. top of the hill. Average speed iswill equal to miles. total For Therefore, the total round-trip be 50 distance divided byto total time. miles by 1 the average speed be 50 mph 25 for the divided round-trip, hour is 25 must mph. travel Therefore, theintrain the train 50 miles one traveled hour, but 25 the miles to reachused the top of the hillon in 1 the hour. train already up that hour trip up the hill. Therefore, it is impossible for the train to average 50 mph for the trip. IOT I 1 -11 POLY ENGINEERING
PROBLEM #3: HOMEWORK (PENTAGON SYMBOLS): This pentagon is divided into 5 equal parts. By coloring in one or more parts, how many unique patterns can you form? [A pattern is not unique if it can be achieved by rotating another pattern or if it is a mirror image of another pattern. Use only one color. ] IOT I 1 -11 POLY ENGINEERING
PROBLEM #4: HOMEWORK (BLOCKED UP): Arrange the blocks into three equal columns so that the sum of the numerals on the blocks is the same for each of the three columns. IOT I 1 -11 POLY ENGINEERING
September 17, 2010 HOMEWORK: (Problem Solving) 1. Complete any problems from today’s lesson that you didn’t already finish. 2. Answer problems #3 (Pentagon Symbols), #4 (Blocked Up) and #5 (Power Plant Location) on the printed sheet. IOT I 1 -11 POLY ENGINEERING
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