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Welcome to Week 8 College Trigonometry Conics Any plane cutting a cone, regardless of its angle, will produce a “conic” Conics Conics treasure hunt! Conics Circle: set of points in a plane whose distances from a fixed point (the center) are constant (denoted "r") ( x - h ) 2 + ( y - k ) 2 = r2 Radius: r Center: (h,k) Conics Ellipse: “squashed circle” set of points in a plane whose distances from two fixed points (the foci) have a constant sum Conics Two types of ellipses: horizontal vertical Conics Horizontal ellipse: (x - h)2 + (y - k)2 = 1 a2 b2 Vertical ellipse: (y - k) 2 + (x - h)2 = 1 a2 b2 “a” is the long axis, “b” the short one, (h,k) is the center Conics A circle is a special case of the ellipse where the foci are the same point Conics IN-CLASS PROBLEMS An ellipse has Foci: (0, -4), (0, 4) Vertices: (0, -6), (0, 6) Is it horizontal or vertical? Conics Parabola: set of points in a plane that are equidistant from a fixed point F (the focus) and a fixed line (the directrix) ax2 + bx + c = y Conics Two types of parabolas: N/S y = a(x - h)2 + k E/W x = a(y - k)2 + h Conics Parabolas have a property that makes them useful in the design of reflectors and transmitters Conics A particle approaching a parabola on a line parallel to the axis is reflected through the focus Conics This property is used to focus incoming light by a parabolic mirror on a telescope Conics Also, signals emanating from the focus are reflected parallel to the axis, a property used in radio transmitters and headlights Conics IN-CLASS PROBLEMS Where would you place the transmitter on a parabolic dish antenna to maximize the transmitted signal? a) b) c) d) At At At At the the the the vertex focus directrix outer edge of the dish Conics Hyperbola: set of points in a plane whose distances from two fixed points (the foci) have a constant difference Conics Two types of hyperbolas: E/W: (x - h)2 - (y - k)2 = ±1 a2 b2 N/S: (y - k)2 - (x - h)2 = ±1 a2 b2 Conics IN-CLASS PROBLEMS Which conic section is the graph of the equation: y2 = y2/2 x2 + y2/2 23x – 2 – x2/4 = 1 y2 = 1 + x2/4 = 1 Questions? New Topic Counting stuff… Sequences 1 2 3 What’s the next item in this sequence? Sequences 1 3 5 7 What’s the next item in this sequence? Sequences Sequences are ordered lists Sequences They don’t have to be numbers Sequences →→ Sequences Sequences Each member of a sequence is called a “term” Sequences Each term is designated by a subscript: a1, a2, a3, ..., an, ... The 2nd term in the sequence is a2 The nth term is an Sequences IN-CLASS PROBLEMS What is a17 in the sequence: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 Sequences An infinite sequence goes on forever: a1, a2, a3, ... A finite sequence stops at some point: a1, a2, a3, ..., a12 Sequences IN-CLASS PROBLEMS Which is the infinite series: 1 2 3 5 8 13 21 … 2 4 6 8 10 Sequences Numerical sequences are often formed by a formula that uses one term to calculate the next term in the sequence Sequences You evaluate a sequence by plugging in the requested numbers for each term Sequences IN-CLASS PROBLEMS What is a3 if n = 3 and an = 3 / n ? Sequences IN-CLASS PROBLEMS What is a3 if n = 3 and an = 3 / n ? Plug in n=3! Sequences IN-CLASS PROBLEMS What is a3 if n = 3 and an = 3 / n ? an = 3 / n a3 = 3 / 3 a3 = 1 Sequences IN-CLASS PROBLEMS What is an if n = 2 a1 = 4 an = an-1 + 1 Sequences IN-CLASS PROBLEMS What is an if n = 2 a1 = 4 an = an-1 + 1 Plug in n = 2 Sequences IN-CLASS PROBLEMS What is an if n = 2 a1 = 4 an = an-1 + 1 a2 = a2-1 + 1 a2 = a1 + 1 What is a1? Sequences IN-CLASS PROBLEMS What is an if n = 2 a1 = 4 an = an-1 + 1 a2 = a2-1 + 1 a2 = a1 + 1 a2 = 4 + 1 a2 = 5 Sequences These are called “recursion formulas” - the formula calculates each term based on the previous term Sequences (You have to be given a starting term) Questions? Series If you combine the numbers in a sequence into a single number, it’s called a “series” Series IN-CLASS PROBLEMS What is the sum of the first 10 counting numbers? Series IN-CLASS PROBLEMS What is the sum of the first 10 counting numbers? 1+2+3+4+5+6+7+8+9+10 Series IN-CLASS PROBLEMS Here’s a trick: 1 + 10 = 11 2 + 9 = 11 3 + 8 = 11 4 + 7 = 11 5 + 6 = 11 So the answer is 5 * 11 = 55 Series It’s math class… so there’s always a new symbol! ∑ means “add ‘em up!” Series We could have written: What is the sum of the first 10 counting numbers? as: ∑1 2 3…10 Series We usually use ∑ with a formula: 10 ∑ n n=1 This means “add up the n’s where n goes from 1 to 10” Series IN-CLASS PROBLEMS What is 4 ∑ (n + 1) n=1 Series IN-CLASS PROBLEMS What is 4 ∑ (n + 1) n=1 Just start adding up the (n + 1)s Plugging in n=1, n=2, n=3, n=4 Series IN-CLASS PROBLEMS What is 4 ∑ (n + 1) n=1 = 1 + 1 + 2 + 1 + 3 + 1 + 4 + 1 = 2 + 3 + 4 + 5 = ? Series Always new symbols! Factorial notation n! = n(n-1)(n-2)...3 * 2 * 1 Series So, 4! would be: 4 * (4-1) * (4-2) * (4-3) Don’t go to 4-4 (that would be zero…) 4! = 4 * 3 * 2 * 1 = ? Series IN-CLASS PROBLEMS What is 9! ? What is 5! ? Series IN-CLASS PROBLEMS What is 9!/5! ? Questions? Arithmetic Sequences 1 2 3 What’s the next item in this sequence? Arithmetic Sequences 1 3 5 7 What’s the next item in this sequence? Arithmetic Sequences 1 4 7 10 What’s the next item in this sequence? Arithmetic Sequences These are called “arithmetic sequences” air-rith-MEH-tic not ah-RITH-meh-tic Arithmetic Sequences Each term in the sequence (after the first) differs from the preceding one by a constant amount (positive or negative) Arithmetic Sequences start with a1 increase each time by "d" Arithmetic Sequences IN-CLASS PROBLEMS start with a1 increase each time by "d" 3 7 11 15 19 … What is a1? What is d? Arithmetic Sequences start with a1 increase each time by "d" General term of an arithmetic sequence: an = a1 + (n-1)d Arithmetic Sequences IN-CLASS PROBLEMS an = a1 + (n-1)d If a1 = 0 and d = 3 what are the first four terms of the arithmetic sequence? Just plug in a1 and d and n= 1,2,3,4 Arithmetic Sequences IN-CLASS PROBLEMS an an a1 a2 a3 a4 = = = = = = a1 + (n-1)d 0 + (n-1)3 0 + (1-1)3 = 0 + (2-1)3 = 0 + (3-1)3 = 0 + (4-1)3 = ? ? ? ? Sequences You can calculate the 10,000th term in an arithmetic sequence using the formula without having to list up the 9,999 that come before it! Arithmetic Sequences IN-CLASS PROBLEMS If a1 = 5 and d = 2 what are the first four terms of the arithmetic sequence? Arithmetic Sequences IN-CLASS PROBLEMS If a1 = 5 and d = 2 what are the first four terms of the arithmetic sequence? an = a1 + (n-1)d Arithmetic Sequences IN-CLASS PROBLEMS If a1 = 5 and d = 2 what are the first four terms of the arithmetic sequence? an = 5 + (n-1)2 n = ? Arithmetic Sequences IN-CLASS PROBLEMS If a1 = 5 and d = 2 what are the first four terms of the arithmetic sequence? a1 a2 a3 a4 = = = = 5 5 5 5 + + + + (1-1)2 (2-1)2 (3-1)2 (4-1)2 = = = = Arithmetic Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the arithmetic sequence 1, 4, 7…? Arithmetic Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the arithmetic sequence 1, 4, 7…? an = a1 + (n-1)d What is a1? What is d? What is n? Arithmetic Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the arithmetic sequence 1, 4, 7…? a1 a2 a3 a4 a5 = = = = = 1 1 1 1 1 + + + + + (1-1)3 (2-1)3 (3-1)3 (4-1)3 (5-1)3 = = = = = Arithmetic Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the arithmetic sequence 1, 4, 7…? a1 a2 a3 a4 a5 = = = = = 1 1 1 1 1 + + + + + (1-1)3 (2-1)3 (3-1)3 (4-1)3 (5-1)3 = = = = = 1 4 7 10 13 Arithmetic Sequences IN-CLASS PROBLEMS So the sum is: 1+4+7+10+13 = 14*2 + 7 = 35 Arithmetic Sequences Sum of the first n terms of an arithmetic series: Sn = n (a1 + an) 𝟐 For ours: S5 = (1 + 13) = 35 5 𝟐 Geometric Sequences What is the next term in this sequence: 1 2 4 8 Geometric Sequences How about this one? 1 3 9 27 Geometric Sequences Geometric sequences - each term in the sequence (after the first) is a common multiple (positive or negative) of the previous term Geometric Sequences For a geometric sequence, you need: the starting value a1 the multiple r Geometric Sequences IN-CLASS PROBLEMS For the sequence: 1 4 16 64 What is a1? What is r? Geometric Sequences General term of a geometric series: an = a1r n-1 Geometric Sequences IN-CLASS PROBLEMS If a1 = 1 and r = 2, what are the first four terms of the geometric sequence? Geometric Sequences IN-CLASS PROBLEMS If a1 = 1 and r = 2, what are the first four terms of the geometric sequence? an = a1r n-1 Geometric Sequences IN-CLASS PROBLEMS If a1 = 1 and r = 2, what are the first four terms of the geometric sequence? an = 1(2 n-1) What is n? Geometric Sequences IN-CLASS PROBLEMS If a1 = 1 and r = 2, what are the first four terms of the geometric sequence? a1 a2 a3 a4 = = = = 1(2 1-1) 1(2 2-1) 1(2 3-1) 1(2 4-1) = = = = ? ? ? ? Geometric Sequences IN-CLASS PROBLEMS If a1 = 1 and r = 2, what are the first four terms of the geometric sequence? a1 a2 a3 a4 = = = = 1(2 1-1) 1(2 2-1) 1(2 3-1) 1(2 4-1) = = = = 1(1) 1(2) 1(4) 1(8) = = = = 1 2 4 8 Geometric Sequences IN-CLASS PROBLEMS If a1 = 2 and r = 2, what are the first four terms of the geometric sequence? Geometric Sequences IN-CLASS PROBLEMS If a1 = 2 and r = 2, what are the first four terms of the geometric sequence? an = a1r n-1 Geometric Sequences IN-CLASS PROBLEMS If a1 = 2 and r = 2, what are the first four terms of the geometric sequence? an = 2(2 n-1) What is n? Geometric Sequences IN-CLASS PROBLEMS If a1 = 2 and r = 2, what are the first four terms of the geometric sequence? a1 a2 a3 a4 = = = = 2(2 1-1) 2(2 2-1) 2(2 3-1) 2(2 4-1) = = = = ? ? ? ? Geometric Sequences IN-CLASS PROBLEMS If a1 = 2 and r = 2, what are the first four terms of the geometric sequence? a1 a2 a3 a4 = = = = 2(2 1-1) 2(2 2-1) 2(2 3-1) 2(2 4-1) = = = = 2(1) 2(2) 2(4) 2(8) = = = = 2 4 8 16 Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? an = a1r n-1 What is a1? What is r? Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? an = 1(4 n-1) What is n? Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? a1 a2 a3 a4 a5 = = = = = 1(4 1-1) 1(4 2-1) 1(4 3-1) 4-1 1(4 ) 1(4 5-1) = = = = = ? ? ? ? ? Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? a1 a2 a3 a4 a5 = = = = = 1(4 1-1) 1(4 2-1) 1(4 3-1) 4-1 1(4 ) 1(4 5-1) = = = = = 1 4 16 64 256 Geometric Sequences IN-CLASS PROBLEMS What is the sum of the first five terms in the geometric sequence 1, 4, 16…? 1 + 4 + 16 + 64 + 256 = 341 Geometric Sequences Sum of the first n terms of a geometric series: Sn = For ours: S5 = = 𝒂𝟏 (𝟏−𝒓𝒏 ) 𝟏−𝒓 𝟏(𝟏−𝟒𝟓 ) 𝟏−𝟏𝟎𝟐𝟒 = 𝟏−𝟒 𝟏−𝟒 −𝟏𝟎𝟐𝟑 = 341 −𝟑 Geometric Sequences IN-CLASS PROBLEMS Which is geometric? 3 6 9 12 1 2 4 8 7 10 13 16 2 3 4.5 6.75 2 4 6 8 Questions? Fundamental Counting Principle the number of ways things can occur Fundamental Counting Principle Male/Female and Tall/Short How many ways can these characteristics combine? Fundamental Counting Principle Male/Female and Tall/Short I try to build a tree: Fundamental Counting Principle Male/Female Male / \ Tall Short and Tall/Short Female / \ Tall Short Fundamental Counting Principle IN-CLASS PROBLEMS Male / \ Tall Short Female / \ Tall Short 4 possible ways to combine the characteristics: MT MS FT FS Fundamental Counting Principle How about: Blonde/Brunette/Redhead and Blue eyes/Green eyes/Brown eyes Build a tree! Fundamental Counting Principle IN-CLASS PROBLEMS Blonde / | \ Bl Br Gr Brunette / | \ Bl Br Gr Red / | \ Bl Br Gr How many ways to combine these characteristics? Fundamental Counting Principle IN-CLASS PROBLEMS Blonde / | \ Bl Br Gr Brunette / | \ Bl Br Gr Red / | \ Bl Br Gr How many ways to combine these characteristics? 9: BdBl BdBr BdGr BtBl BtBr BtGr RdBl RdBr RdGr Fundamental Counting Principle The number of ways in which characteristics can be combined is found by multiplying the possibilities of each characteristic together Fundamental Counting Principle IN-CLASS PROBLEMS Two pairs of jeans: black blue Three shirts: white yellow blue Two pairs of shoes: black brown How many different ways can you get dressed? Fundamental Counting Principle IN-CLASS PROBLEMS Two pairs of jeans: black blue Three shirts: white yellow blue Two pairs of shoes: black brown How many different ways can you get dressed? 2 * 3 * 2 = 12 Fundamental Counting Principle IN-CLASS PROBLEMS Multiple choice quiz 10 questions 4 choices on each How many ways are there to answer the questions on the test? Fundamental Counting Principle IN-CLASS PROBLEMS Multiple choice quiz 10 questions 4 choices on each 4 * 4 * 4 *… (10 of them) Fundamental Counting Principle IN-CLASS PROBLEMS Multiple choice quiz 10 questions 4 choices on each 4 * 4 * 4 *… (10 of them) Otherwise known as 410 = 1,048,576 Fundamental Counting Principle IN-CLASS PROBLEMS Multiple choice quiz 10 questions 4 choices on each How many ways out of the 1,048,576 can you get a 100? Fundamental Counting Principle IN-CLASS PROBLEMS Multiple choice quiz 10 questions 4 choices on each 1/1,048,576 chance of getting 100% if you guess on all questions Fundamental Counting Principle IN-CLASS PROBLEMS How many zip codes? 5 slots Can’t start with a 0 or a 1 Fundamental Counting Principle IN-CLASS PROBLEMS How many zip codes? ___ ___ ___ ___ ___ Fundamental Counting Principle IN-CLASS PROBLEMS How many zip codes? 8 10 10 10 10 Fundamental Counting Principle IN-CLASS PROBLEMS How many area codes? 8 10 10 8*104 = 80,000 10 10 Fundamental Counting Principle IN-CLASS PROBLEMS In Canada, they alternate Letter Number Letter Number Letter Number How many area codes can they have? Fundamental Counting Principle IN-CLASS PROBLEMS In Canada, they alternate Letter Number Letter Number Letter Number 26*10*26 * 10*26*10 = 263 * 103 = 17,576,000 (A whole lot more than 80,000!) Questions? Liberation! Be sure to turn in your assignments from last week to me before you leave Don’t forget your homework due next week! Have a great rest of the week!
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