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Math lessons for gifted students, grade 7 |
Math Lessons for Gifted Students Level F (grade 7) Center Impulse Week-end and evening classes for gifted students grades 5-9 Canada, ON, L4K 1T7, Vaughan (Toronto), 80 Glen Shields Ave., Unit #10. Phone (416)826-7270 [email protected] Content Click on the lesson! |
1. Brian ran 2 km less than Tom and 3 km greater than Dan. They ran a total distance of 26 km. Find how far each boy ran. 2. Solve the following problems. 3. Line segments AE and AF trisect the area of the square ABCD. Find the ratio DF : FC. 4. Although we are not aware of it, we are constantly moving in a circle, along with the Earth, making one complete rotation each day. If you were on the equator, you would complete a circle with a radius equal to the Earth's radius. The radius of the Earth at the equator is 6 378 km. If you were on the equator, find: 5. A car traveled 414 km on 46 L of gasoline. How far will the car travel on 200 L of gasoline? 6. Calculate the unit price for each of the following: 7. Solve the following problems: 8. Solve equations. 9. In triangles ABC and A'B'C', M and M' are the midpoints of BC and B'C' respectively. Prove that the triangles ABC and A'B'C' are congruent if AC = A'C', BC = B'C', and AM = A'M'. 10. Suppose this pattern were continued. 11. Find the angle measure indicated by each letter. 12. All rows, columns, and diagonals of a magic square have the same sum. Complete the magic square.
2. aa a) $22.75 aaaaaaaaaa 2) $125.00. 3. aa 2 : 1 4. aaa a) 40 074 km; aaa b) 1 670 km/h. 5. aa 1 800 km 6. aaa a) $3.99/L; aaa b) $1.99/L; aaa c) $7.92/kg; 7. aaa 1) 2/15 aaa 2) 16; aaa 3) 54. 8. aa 1) 11; aaa 2) 8.4; aaa 3) -11; aaa 4) 4. 9.
10. aa 1) 41 aaa 2) 4n - 3. 11. aa 1) x = 35o; aa 2) y = 20o. 12.
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1. Marie ran twice as far as Brenda and 4 km less than Lana. They ran a total distance of 19 km. Find how far each girl ran. 2. Solve the following problems. 3. Find the four numbers in the ratio 3 : 4 : 6 : 9 whose sum is 330. 4. A 500 m track has semicircular ends. If the length of the track is three times its width, what is the width? 5. Seven meters of steel wire has a mass of 11.9 kg. What is the mass of 53 m of the same steel wire? 6. Which is the better value? 7. If 5/36 of a number is 73 1/3, what is 13/88 of the original number? 8. Solve equations. 9. In triangles ABC and A'B'C', M and M' are the midpoints of BC and B'C' respectively. Prove that the triangles ABC and A'B'C' are congruent if AB = A'B', AC = A'C', and AM = A'M'. 10. The diagrams show the molecular structure of some fuels. C represents a carbon atom and H represents a hydrogen atom. 11. Find the angle measure indicated by each letter. 12. All rows, columns, and diagonals of a magic square have the same sum. Complete the magic square.
2. aa a) $1.96; aaaaaaaaaa b) $61.20. 3. aa 45, 60, 90, 135. 4. aaa 500 / (4 + pi) = 70 m. 5. aa 90.1 kg. 6. aaa a) The second choice is better: $1.72/L > $1.70/L; aaa b) The first choice is better: $1.2/kg < $1.3/kg. 7. aaa 78. 8. aa 1) -1; aaa 2) -19.3; aaa 3) 9; aaa 4) 0.6. 9.
10. aa 1) 18 aaa 2) 2n + 2. 11. aa 1) x = 40o; aa 2) y = 80o. 12.
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1. The combined mass of a dog and a cat is 24 kg. The dog is three times as heavy as a cat. Find the mass of each animal. 2. Solve the following problems. 3. A triangle has sides in the ratio 3 : 5 : 6. The perimeter of the triangle is 210 cm. Find the length of each side of the triangle. 4. In one year the Earth travels once around the sun. It follows a circle with a radius approximately 1.5 x 108 km. 5. An astronaut who has a weight of 72 kg on Earth has a weight of 12 kg on the moon. If another astronaut has a mass of 10.5 kg on the moon, what is her mass on Earth? 6. Fred earns $75.15 for 9 h of work. 7. What part of an hour elapses between 11:50 a.m. and 12:14 p.m.? 8. Solve equations. 9. In a triangle ABC, BE _|_ AC, CD _|_ AB, BD = CE. Prove that AB = AC. 10. The squares along one diagonal of each face of a cube are colored, as shown, including the diagonals of the faces that can't be seen. 11. Find the angle measure indicated by each letter. 12. All rows, columns, and diagonals of a magic square have the same sum. Complete the magic square.
2. aa a) $15 000, $ 235 000; aaaaaaaaaa b) 7.8 %. 3. aa 45 cm, 75 cm, 90 cm. 4. aa a) 2.58 x 106 km; aa b) 1.076 x 105 km/h. 5. aa 63 kg. 6. aaa a) $233.80; aaa b) 41 h. 7. aaa 0.4. 8. aa 1) 1.5; aaa 2) 105.94; aaa 3) 25.45; aaa 4) 24. 9.
10. aa 1) 36 aaa 2) 540 aaa 3) 6n, 6n2w - 6n. 11. aa 1) x = 20o; aa 2) y = 30o. 12.
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1. A Jaguar traveled 1.2 times as fast as a Mercedes. The difference in their speeds was 24 km/h. Find the speed of each car. 2. Solve the following problems. 3. A microbe 0.002 mm long, seen under a microscope, appears to be 4 mm long. What is the magnifying power of the microscope? 4. A path 2 m wide is to enclose a circular lawn that has a 25 m radius. What will be the total cost of the material for the path if the cost per square meter is $ 3.00? 5. A tree of height 42 m casts a shadow of 24 m. Find the height, in meters, of a tree casting a 20 m shadow. 6. The moon revolves around the earth 4 times in 118 days. 7. Twenty nine thirty sixths of a number is 6 11/18 less than 18 7/24. What is the number? 8. Solve equations. 9. ABC is an equilateral triangle and AK = BM = CL. Prove that KML is an equilateral triangle. 10. How many squares are needed to make the 40-th figure in this pattern? Write an expression for the number of squares in terms of the number of diagram. 11. Find the angle measure indicated by each letter. 12. All rows, columns, and diagonals of a magic square have the same sum. Complete the magic square.
2. aa a) 24%; aaaaaaaaaa b) 33.144 %. 3. aa 2 000 : 1. 4. aa $980.18. 5. aa 35 m. 6. aa a) 442.5 days; aa a) 111 times. 7. aa 14.5. 8. aa 1) 3.3; aaa 2) 10; aaa 3) 4; aaa 4) 0.7. 9.
10. aa 121, 3n + 1. 11. aa 1) x = 45o; aa 2) y = 40o. 12.
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1. Joan's jump was longer than Enid's jump by 15 cm. Joan's jump was 1.04 times as long as Enid's jump. How far did each person jump? 2. Solve the following problems. 3. A gear 50 inches in diameter turns a small gear 30 inches in diameter. If the larger gear makes 15 revolutions, how many revolutions does the smaller gear make in that time? 4. A bicycle has a diameter of 50 cm. How far does the bicycle travel when the wheel makes 30 turns? 5. In physics, Hook' law says that the force exerted by a spring is proportional to the amount that the spring is stretched. If a force of 70 N is needed to stretch a spring 4 cm, what force is needed to stretch the same spring 6.8 cm? 6. A drain can lower the water level of a pool 15 cm in 2 h. 7. What is the minimum number of identical square tiles required to completely tile a rectangle having dimensions 1 13/14 cm by 2 1/4 cm? 8. Solve equations. 9. ABC is an isosceles triangle with AB = AC, D is a point inside the triangle such that Angle (DBC) = Angle (DCB). Prove that AD bisects the angle BAC. 10. Use the pattern suggested by the diagram to evaluate this sum: 1 + 3 + 5 + 7 + ... + 15. Find the formular for the sum 1 + 3 + 5 + ... + (2n - 1). 11. Find the angle measure indicated by each letter. 12. Find the following and express your answer in lowest terms. 2. aa a) $ 168.75; aaaaaaaaaa b) $ 200. 3. aa 25. 4. aa 47.125 m. 5. aa 119 N. 6. aa a) 4 h 24 min; aa a) 45 cm. 7. aa 42. 8. aa 1) 1; aaa 2) 3; aaa 3) 5; aaa 4) 12. aaa 5) -3. aaa 6) -2. 9.
10. aa 1 + 3 + 5 + 7 + ... + 15 = 82 = 64, 1 + 3 + 5 + ... + (2n - 1) = n2. 11. aa 1) x = 30o; aa 2) y = 20o. 12. aa 1) 1/4; aaa 2) 6; aaa 3) 4/9; aaa 4) 1/2. |
1. The length of a rectangle is 5 cm longer than the width. The perimeter is 78 cm. Find the dimensions of the rectangle. 2. What was the original price of a radio that sold for $70 during a 20%-off sale? 3. A school has enough bread to feed 30 children for 4 days. If 10 more children are added, how many days will the bread last? 4. Sam's bicycle has wheels each of which has a diameter of 60 cm. When Sam goes for a 2 km ride on his bike, find the approximate number of times each wheel will rotate. 5. To estimate the number of trout in a lake, the game warden caught 85 trout, tagged them, and then released them. Later, he caught 95 trout and found tags on 7 of them. Approximately how many trout are in the lake? 6. The amount of energy required to melt 16 g of ice is about 5.3 kJ. 7. It requires 1 hour 10 minutes to fill 7/12 of a swimming pool. Find the number of hours required to fill the remainder of the pool at this rate. 8. Solve equations. 9. ABC is an isosceles triangle with AB = AC, AM is the median drawn to BC. Find AM if the perimeters of the triangles ABC and ABM are 50 cm and 40 cm respectively. 10. Suppose this pattern were continued. 11. Find the angle measure indicated by each letter. 12. Find the following and express your answer in lowest terms. 1. aa Length: 22 cm, width: 17 cm. 2. aa $ 87.50; 3. aa 3 days. 4. aa 1 061. 5. aa About 1150. 6. aa a) 16.56 kJ; aa b) 90.7 g. 7. aa 50 min. 8. aa 1) -3; aaa 2) 0; aaa 3) 2; aaa 4) 5.4. aaa 5) 1/3; aaa 6) 7. 9. aa AM = 15 cm. 10. aa a) 28; b) aa y = 3x - 2. 11. aa 1) x = 36o; aa 2) y = 37.5o. 12. aa 1) 13 4/7; aaa 2) 1/8; aaa 3) 2 2/3; aaa 4) 1/27. |
1. A rectangular table is twice as long as it wide. How long is the table if its perimeter is 15.6 m? 2. Express each reduction as a percent, to 1 decimal place, of the original price. 3. If 15 cans of food are needed for seven adults for two days, what is the number of cans needed to feed four adults for seven days? 4. AE is divided into four equal parts and semicircles are drawn on AC, CE, AD, and DE, creating paths from A to E as shown. Determine the ratio of the length of the upper path to the length of the lower path. 5. Two steel spheres have 1-inch and 2-inch radii, respectively. The smaller weighs 9.5 pounds. Find the weight of the larger. 6. A jet travels 2 400 km in 3h. 7. The mass of a candy-bar wrapper is 1/11 the mass of the wrapped bar. If the candy bar alone has a mass of 75 g, what is the mass of the wrapper? 8. Solve equations. 9. In the diagram, AB is parallel to DC. The semicircle AED has the diameter AD of length 4 cm. Find the perimeter and the area of the figure. 10. Determine if it is possible to draw each diagram without lifting your pencil from the paper, and without going any line twice. 11. Find the angle measure indicated by each letter. 12. Find the following and express your answer in lowest terms. 1. aa 5.2 m. 2. aa a) 7.593% aa b) 20%. 3. aa 30 cans. 4. aa 1 : 1. 5. aa 76 pounds. 6. aa a) 6 000 km; aa a) 7.25 h. 7. aa 7.5 g. 8. aa 1) 6; aaa 2) 39; aaa 3) 1; aaa 4) 1. 9. aa Perimeter = 2 pi + 20 cm., 2 pi + 30 cm2. 10. aa yes, yes, yes, no. 11. aa 1) x = 30o; aa 2) y = 60o. 12. aa 1) 0; aaa 2) 1.5; aaa 3) 1; aaa 4) 60 1/3. |
1. A rectangular walk is a line of 9 identical square cement tiles. The perimeter of the walk is 40 m. What is the area of each cement tile? 2. Solve the following problems. 3. In an isosceles triangle, the two different sizes of angles are in the ratio 4 : 7. What are the angles? 4. Four pipes, each of diameter 1 m, are held tightly together by a metal band as shown. How long is the band? 5. If 3 miles are equivalent to 4.83 kilometers, then 11.27 kilometers are equivalent to how many miles? 6. Janet travels 48 km in 45 minutes. Find her speed, in kilometers per hour. 7. Lorie is one-third of the way up a flight of stairs. If she climbs 11 more steps, she will be half way up. Find the number of steps in the flight. 8. Solve equations. 9. In a triangle ABC, AB = 41 cm, BC = 15 cm, BH _|_ AC, BH = 9 cm. Determine the area of the triangle ABC. 10. Staccy has a 3 L bucket and an 8 L bucket. How can she use these two unmarked buckets to obtain exactly 4 L of water? 11. Find the angle measure indicated by each letter. 12. Find the following and express your answer in lowest terms. 1. aa 4 m2. 2. aa a) 800 m3, aa b) $39. 3. aa 48o, 48o, 84o or 40o, 70o, 70o. 4. aa pi + 4 m. 5. aa 7 miles. 6. aa 64 km/h. 7. aa 66. 8. aa 1) 1/12; aaa 2) 15; aaa 3) 2.88; aaa 4) 2 25/32. 9. aa 234 cm2. 10.
11. aa 1) x = 15o; aa 2) y = 150o. 12. aa 1) 5 7/12; aaa 2) 1 5/6. |
1. A milk shake costs twice as much as an order of French fries. If two milk shakes and three orders of French fries cost $4.20, what is the cost of a milk shake? 2. Solve the following problems. 3. The ratio of nickels to dimes to quarters in a sum of money is 3 : 4 : 5. What is the value of the money if there are 204 coins? 4. Find the area of a circle whose circumference is pi2. 5. A map is drawn so that 1 cm represents 30 km (the scale on the map is 1 : 3 000 000). How far apart are two cities if they are 11.4 cm apart on the map? 6. From 9 a.m. to 2 p.m., the temperature rose at a constant rate from -14o F to +36o F. What was the temperature at noon? 7. The grand prizewinner of a lottery won 7/10 of the total prize money available. Shortly the reafter, she spent 3/4 of the winnings, and still had $2 100 left. Find the total amount of prize money available in the lottery. 8. Solve equations. 9. What is the area of an equilateral triangle with sides s units long? 10. A train leaves at 7:00 a.m. daily from Toronto bound for Vancouver. Simultaneously, another train leaves Vancouver for Toronto. The journey takes exactly 4 days in each direction. If a passenger boards a train in Vancouver, how many Vancouver bound trains will she pass in route to Toronto? 11. One angle of a triangle is twice the size of the second angle, and the third angle is 66o. Find the smallest angle. 12. Find the following and express your answer in lowest terms. 1. aa $1.20. 2. aa a) $336 aa b) 35 cm. 3. aa $30.6. 4. aa 0.25рi3. 5. aa 342 km. 6. aa 16oF. 7. aa $12 000. 8. aa 1) -34; aaa 2) 79; aaa 3) 45/91; aaa 4) 1/7. 9. aa Area = s2sqrt(3)/4. 10. aa 7 trains. 11. aa 38o. 12. aa 1) 3; aaa 2) 3/8; aaa 3) 10; |
1. Donna's average mark out of three tests was 84 out of 100. Her highest mark was one-and-one-quarter times her lowest mark. The middle mark was 81. What were Donna's marks on the three tests? 2. Solve the following problems. 3. A pulley having a 9-inch diameter is belted to a pulley having a 6-inch diameter, as shown in the figure. If the large pulley runs at 120 rpm, how fast does the small pulley run, in revolutions per minute? 4. A square and a circle have equal perimeters. Find the ratio of the area of the square to the area of the circle. 5. The scale of a map reads 1 : 500 000. Find the distance, in km, between two towns, which are 2.5 cm apart on the map. 6. Village A has a population of 6 800, which is decreasing at a rate of 120 per year. Village B has a population of 4 200, which is increasing at a rate of 80 per year. In how many years will the population of the two villages be equal? 7. At Ungerville High School, the ratio of girls to boys is 2 : 1. If 3/5 of the boys are on a team and the remaining 40 boys are not, how many girls are in the school? 8. Solve equations. 9. Given that the area if the triangle ABD is 12. 5 cm2, AD = 5 cm, DC = 7 cm, determine the area of the triangle ABC. 10. What is the 100-th number in the pattern 2, 5, 8, 11, 14, 17, ...? 11. In a triangle ABC, angle B is 36o larger than angle A, and angle C is six times angle A. Find the number of degrees in angle A. 12. Find the following and express your answer in lowest terms. 1. aa 76, 81, 95. 2. aa a) 5 ounces aa b) 62.5. 3. aa 180 rpm. 4. aa рi : 43. 5. aa 12.5 km. 6. aa 13 years. 7. aa $12 000. 8. aa 1) -34; aaa 2) 79; aaa 3) 45/91; aaa 4) 1/7. 9. aa Area = 30 cm2. 10. aa 299. 11. aa 18o. 12. aa 1) 5 5/9; aaa 2) 3/8. |
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