Fractions Notes - CLC Charter School
... 2x2x2x2; 2x2 matches, so the GCF is 4. To compare fractions; find the common denominator by finding the LCM. The LCM becomes the new denominator and the numerator is multiplied by the same factor as the denominator. Remember whatever you do to the top, you have to do to the bottom LCM – find the pri ...
... 2x2x2x2; 2x2 matches, so the GCF is 4. To compare fractions; find the common denominator by finding the LCM. The LCM becomes the new denominator and the numerator is multiplied by the same factor as the denominator. Remember whatever you do to the top, you have to do to the bottom LCM – find the pri ...
seq and series notes
... Arithmetic Sequences Melanie is starting to train for a swim meet. She begins by swimming 5 laps per day for a week. Each week she plans to increase her number of daily laps by 2. How many laps per day will she swim during the 15th week of training? ...
... Arithmetic Sequences Melanie is starting to train for a swim meet. She begins by swimming 5 laps per day for a week. Each week she plans to increase her number of daily laps by 2. How many laps per day will she swim during the 15th week of training? ...
(1) What is the last digit in 20032003? [That`s 2003 raised to the
... (21) Three red dots and three blue dots are placed randomly in the plane, the only restriction being that no three of the six dots can be collinear. Nine line segments are then drawn, one from each red dot to each blue dot. What is the fewest possible number of intersections formed by these line seg ...
... (21) Three red dots and three blue dots are placed randomly in the plane, the only restriction being that no three of the six dots can be collinear. Nine line segments are then drawn, one from each red dot to each blue dot. What is the fewest possible number of intersections formed by these line seg ...
Maths Calculation Policy - The Batt C of E Primary School
... The Batt School Calculation Policy 2015 ...
... The Batt School Calculation Policy 2015 ...
Fractions / Practise 18
... 14. Skateboards cost £36 each in my local store. The shopkeeper says if I buy one I can buy another for only 7/9 of the normal price. How much would two skateboards cost? ...
... 14. Skateboards cost £36 each in my local store. The shopkeeper says if I buy one I can buy another for only 7/9 of the normal price. How much would two skateboards cost? ...
PPT for Section 2.8, 2.9
... •Addition Principle of Inequalities: Let a, b and c be some numbers. If a < b is true, then a + c < b + c and a – c < b – c are also true. That is, adding or subtracting a number does not affect the inequality sign. •Example: Let a = 2, b = 3, c = 1. Then a < b is true because 2 < 3. Then, adding c ...
... •Addition Principle of Inequalities: Let a, b and c be some numbers. If a < b is true, then a + c < b + c and a – c < b – c are also true. That is, adding or subtracting a number does not affect the inequality sign. •Example: Let a = 2, b = 3, c = 1. Then a < b is true because 2 < 3. Then, adding c ...