SECTION 2 3 GEOMETRIC SERIES i Sums of

SECTION 2. 3 GEOMETRIC SERIES i) Sums of a geometric series and infinite geometric series ii) Deriving the formula for the sum of a geometric series and infinite geometric series © Copyright all rights reserved to Homework depot: www. BCMath. ca

I) SUM OF GEOMETRIC SEQUENCE: Sum of a geometric series up to the nth term Multiply both sides by “r” Subtract the equations! Factor out “Sn” Divide both sides by (1 - r) Factor out “a” © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: FIND THE SUM OF THE FOLLOWINGGEOMETRIC SEQUENCE: © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: FIND THE SUM: First find out how many terms there are Then find the sum up to the “ 14 th”term © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: A RUBBER BALL IS DROPPED FROM A HEIGHT OF 10 AMFTER. EACH BOUNCE, THE BALL RETURNS TO 65% OF ITS PREVIOUS HEIGHT. CALCULATE ALL THE VERTICAL DISPLACEMENT RIGHT BEFORE TH 8 BOUNCE. Note: There are two types of displacement: Going up and down Each displacement is doubled except the first bounce © Copyright all rights reserved to Homework depot: www. BCMath. ca

Jason gave his son a penny on the first day of the month and doubled the amount each day. How much money will he give his son altogether by the 30 th day? © Copyright all rights reserved to Homework depot: www. BCMath. ca

CHALLENGE: THE SUM OF THE SECOND &THIRD TERM IN A GEOMETRIC SERIES IS 45. THE SUM OF THE FOURTH &FIFTH TERM IS 20. FIND THE GEOMETRIC SEQUENCE: Use the. The common to findadd the to first 2 nd andratio 3 rd terms 45 term The 4 th and 5 th terms add to 20 Factor out any common factors In each equation Divide the equations Find the 2 nd series when the common ratio is negative © Copyright all rights reserved to Homework depot: www. BCMath. ca

I) WHAT IS AN INFINITE GEOMETRIC SERIES? A Geometric series with an infinite number of terms If the common ratio is greater than 1, each term will get bigger and the sum will soon add up to infinity Note: Any infinite G. S. with a common ratio to infinity then the sum will add up Most infinite G. S. in sect. 2. 9 will have a common ratio between -1 and 1 Each term in the series will get smaller Eventually some terms will become so small such that adding them will be insignificant, like adding zero © Copyright all rights reserved to Homework depot: www. BCMath. ca

These values are so small such that adding them will be insignificant!! When the ratio is value the infinite G. S. will converge to a fixed © Copyright all rights reserved to Homework depot: www. BCMath. ca

II) FORMULA FOR THE SUM OF ANINFINITE G. S. If the Ratio is bigger than 1, the sum will be positive infinity If the ratio is smaller than -1, the sum will be negative infinity If the Ratio is between 1 and -1, the sum can be obtained through a formula: Formula for the sum of a G. S. with “n” terms If there are infinite terms, then “n” will be infinity Since the value of will be zero The equation will only apply if © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: FIND THE SUM OF THEINFINITE G. S. © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: THE COMMON RATIO OF AN INFINITE GEOMETRIC SERIES IS 0. 75. IF THE SUM OF ALL THE TERMS CONVERGES TO 20, FIND THE FIRST TERM. © Copyright all rights reserved to Homework depot: www. BCMath. ca

GIVEN THE FOLLOWING INFINITE GEOMETRIC SEQUENCE, WHAT SHOULD THE VALUE OF “R” BE SO THAT THE SUM WILL BE 20? The series must be converging So the value of “r” must be between -1 and 1 The answer must be r = 0. 80 © Copyright all rights reserved to Homework depot: www. BCMath. ca

EX: A MOVIE IN A THEATRE GENERATE $250, 000 IN REVENUE IN THE FIRST MONTH OF ITS SHOWING. EACH MONTH, SALES FROM THAT MOVIE DROP BY 15%. IF THE MOVIE IS SHOWN FOR A LONG TIME, WHAT IS THE TOTAL REVENUE GENERATED ? © Copyright all rights reserved to Homework depot: www. BCMath. ca

CHALLENGE: GIVEN THE EQUATION Evaluate the expression: Find a Pattern!!

Given the following infinite series, where each number in the denominator has only “ 2”, “ 3” or “ 5” as a factor. Find the sum: Break the sequence up into 3 geometric series These are terms with all the powers of 2 in the denominator These are terms with all the powers of 3 in the denominator These are terms with all the powers of 5 in the denominator Now we look for all the possible of the denominator will multiples of 2 a 3 b 5 c

HOMEWORK: Assignment 2. 3