Q: The 4th term of a geometric progression is 2/3 and the seventh is 16/81.Find the geometric series
A:
Q: Find the general term of the arithmetic sequence$$ 6, 2,-2,-6,... .$$ O $$an= -4n+10$$ $San=2n2-3$$…
A:
Q: In a Geometric Progression (G.P), the 7th term is 31,250 and the 4th term is 250. Find the: (a).…
A:
Q: n of a geometric progression is -108 and sixth term The common ratio
A:
Q: In an arithmetic progression the first term is 5 and the common difference is 3. The nth term of the…
A: Sum of first n terms = ∑n=1nun=n22a+n-1d where, a=first term, d=common difference
Q: A. Determine whether the sequences below form an Arithmetic progression. If they do, identify its…
A: As per guideline, we can answer first question. Thank you.
Q: The first and sixth term of the arithmetic progression is 2/3 and 22/3 respectively. Find the sum of…
A: Let's find 12th and 17th term sum of arithmetic sequence.
Q: a) How many terms are there in the following Geometric Progression? 2, 4, 8, ... 1024.
A: As per company guideline we can solve one question at a time so i am solving first question. please…
Q: Find the sum of the first 11 terms in a geometric progression 1,-2,4,-8, .... А. 683 В. — 341 C. 768…
A:
Q: Find the 7" term of the geometric sequence 0,0, 0, .. Answer:
A:
Q: Find the indicated term of a geometric sequence. a2 = -6 and r= 1/2 . Find a7
A: We have to find 7th term
Q: Find t, for the arithmetic progression 19, 14. 9. 72 swer:
A:
Q: 3. Find x so that x + 6, x + 12 and x + 15 are consecutive terms of a Geometric Progression.
A: We want to find value of x
Q: Find the sum of the first 11 terms in a geometric progression 1,-2, 4,-8, ... A. 683 В. — 341 С. 768…
A: See the details solution in below
Q: Consider the following arithmetic progression 2, 7, 12, 17, 22, 27... Find the 20th term
A: The given Arithmetic Progression is 2, 7, 12, 17, 22, 27, ... Here, the first term is a=2. The…
Q: 6.Find the fourth term of the progression 1/2, 1/5, 1/8.
A: Let's find.
Q: 64 Is a term of the geometric progression 54, 36, 24...? 9.
A:
Q: 5. Find the indicated term in each geometric progression. 2.5 a. 3, 6, 12, ... 8th term b. 4,-8, 16,…
A:
Q: 5. Find the 10th term of the arithmetic progression 1, 3.5, 6, 8.5,...
A:
Q: In an arithmetic progression the first term is 5 and the common difference is 3. The nth term of the…
A:
Q: Let an be an arithmetic progression, for which a1=15 and d=3. Find the sum of the first 10…
A:
Q: Consider the sequence 8, 5, 2,-1.........-52 a) is the sequence an arithmetic progression? Why or…
A: Arithmetic Progression: A sequence is said to be an arithmetic progression, if the difference…
Q: A new drug and alcohol rehabilitation program performs outreach for members of the community. The…
A: a) The number of participants are 34,50,66,82 The common difference between those numbers is =…
Q: 3. Find the indicated term in each arithmetic progression. a. a, = 4, d= 5, n=12 %3D 2. b. a d =-4,…
A: We have to find indicated term in Questions.
Q: Find the sum of the first 10 terms of the geometric progression 2, 4, 8, 16 …
A: To find the sum of the first 10 terms of the geometric progression 2, 4, 8, 16 ...
Q: Find the sum of the first 11 terms in a geometric progression 1, –2, 4, –8, ... .. A. 683 B. -341 C.…
A:
Q: If (4/5) , a,2 are three consecutive terms of an arithemetic progression then find the value of a.
A:
Q: Find the sum of the first 28 terms in an arithmetic progression 1,6, 11, 16, ... . A. 2059 B. 1918…
A: Given: 1,6,11,16.... n=28, common difference d=> 6-1 =5 first term a=1
Q: Find the 20 term of a geometric progression 1,2, 4, ... А. 1,048,576 В. 131,072 С. 262,144 D.…
A: Given : A geometric progression 1,2,4…
Q: Find t for the arithmetic progression 19, 14, 9, .. t
A: Given : Arithmetic progression : 19,14,9,...
Q: find the sum of the geometric progression 2x, 4x + 14, 20x - 14 . . . up to the 9th term. a. 137774…
A: find the sum of the geometric progression 2x, 4x + 14, 20x - 14 . . . up to the 9th term. a. 137774…
Q: The value is – 39 is , which term of this progression - 1,–3, –5... A. 21st В. 20th С. 19th D. None…
A: To find Which term of the given progression has a value -39
Q: Determine the harmonic mean of the first 4 terms of the sequence: 3, 5, 7,- a. 6 b. 5.08 c. 5.12 d.…
A:
Q: arithmetic progression
A: Please refer to the image below
Q: 3) .., -2, -18, .. 4 A) 3 В) -2 C) 3 D) -6
A: Given a geometric series with missing terms: _____, -2 , _____ , -18 , .........
Q: Find the unknown in arithmetic progression a = 5, d=6, S2=? d = 6
A: Find the solution below
Q: An arithmetic progression has first term 11 and fourth term 32. The sum of the first nine terms is?
A: Formula, S(n) = (n/2) * [2a + (n-1)*d]
Q: Let an be an arithmetic progression, for which the first term a1=1 and common difference d=1. Find…
A:
Q: Which one of the following sequences is a geometric progression? 3,6,12,24,48,. O 1,4,9,16,25,. O…
A:
Q: the first term and the second term of a progression are a and b respectively. what is the third term…
A: As we know that expression of the nth term of the Geometric progression is: an=arn-1 Where 'a' is…
Q: Which of the following is a geometric sequence? O3, 5, 8, 11, ... O3, 5, 7, 9, ... O 64, 32, 16, 8,…
A: Given: Sn=3, 5, 8, 11,...Sn=3, 5, 7, 9,...Sn=64, 32, 16, 8,...Sn=-6, -8, -10,....
Q: Given the parameters of an infinite geometric progression, find the sum of its te a = 15, r =. %3D…
A: Given data: The first term of an infinite geometric progression is a1=15. The common ratio is r=1/5.
Q: (b) - 35.39, - 23.25, (c) 0.0229, 0.4219, (d) 1.49, - 7.79,
A:
Q: It is given 3, 12, x are three consecutive terms of geometric progression. Find the value of x.
A:
Q: The 8th term of an arithmetic progression is 12 and the 39th term is 43. 1. Find first term. a. 7…
A: Note: - Since you have asked multiple questions, we will solve the first question for you. If you…
Q: It is given the first three terms of a geometric progression are 1/5 , 1/25 and 1/125. Find the sum…
A:
Q: Let S denote the sum of the terms of an infinite G.P. and o denote the sum of the terms.show that…
A:
Q: Which one is a geometric progression? 3,12,48,192,... 1,4,9,16,25,... 6,9,12,18,21,...…
A: Solution
Q: Find the 57th term of an arithmetic progression when the 1st term is -18 and the common difference…
A:
Q: Find the sum of the first 28 terms in an arithmetic progression 1,6,11,16, .... ww.R.. A. 2059 В.…
A:
Step by step
Solved in 2 steps with 2 images
- Population Genetics-First Cousins This is a continuation of Exercise 5. Double first cousins are first cousins in two waysthat is, each of the parents of one is a sibling of a parent of the other. First cousins in general have six different grandparents whereas double first cousins have only four different grandparents. For mating between double first cousins, the proportions of the genotypes of the children can be accounted for in terms of those of parents, grandparents, and great-grandparent: 3=122+14+18. a. Find all solutions to the cubic equation above and Identify which is 1. b. After 5 generations, what proportion of the population will be homozygous? c. After 20 generations, what proportion of the population will be homozygous? 5. Population Genetics In the study of population genetics, an important measure of inbreeding is the proportion of homozygous genotypesthat is, instances in which the two alleles carried at a particular site on an individuals chromosomes are both the same. For population in which blood-related individual mate, them is a higher than expected frequency of homozygous individuals. Examples of such populations include endangered or rare species, selectively bred breeds, and isolated populations. in general. the frequency of homozygous children from mating of blood-related parents is greater than that for children from unrelated parents Measured over a large number of generations, the proportion of heterozygous genotypesthat is, nonhomozygous genotypeschanges by a constant factor 1 from generation to generation. The factor 1 is a number between 0 and 1. If 1=0.75, for example then the proportion of heterozygous individuals in the population decreases by 25 in each generation In this case, after 10 generations, the proportion of heterozygous individuals in the population decreases by 94.37, since 0.7510=0.0563, or 5.63. In other words, 94.37 of the population is homozygous. For specific types of matings, the proportion of heterozygous genotypes can be related to that of previous generations and is found from an equation. For mating between siblings 1 can be determined as the largest value of for which 2=12+14. This equation comes from carefully accounting for the genotypes for the present generation the 2 term in terms of those previous two generations represented by for the parents generation and by the constant term of the grandparents generation. a Find both solutions to the quadratic equation above and identify which is 1 use a horizontal span of 1 to 1 in this exercise and the following exercise. b After 5 generations, what proportion of the population will be homozygous? c After 20 generations, what proportion of the population will be homozygous?Find three positive geometric means between 2 and 8I have solved part A. My answer is to add numbers in front of an existing sequence that works. However, I need help with part B, which requires much higher levels of math. I know this problem has a correlation with the Fibonacci sequence(and I was thinking that I could maybe relate it to the closed form formula), or the correlation with golden ratio (such as the relationship between the quotient of the second term and the given term and the golden section 1.618). Please rigorously prove any answers you get, and do not a "simple" answer stating that this problem is just similar to the Fibonacci sequence and that an=an-1+an-2.
- A small town would like to install 9 renewable lighting poles covering a distance of 2900 m. The first pole will be at 170 m.a. Determine the values of each pole location correct to the nearest whole number using arithmetic progression.b. Determine the values of each pole location correct to the nearest whole number using geometric progression.c. If a second town would like to implement the combination of the two methods shown above such that poles are switched between arithmetic and geometric progressions. The first pole will be installed at 150 m and the pole number 25 will be installed at 1350 m. Then poles will be installed based on a geometric model such that it will cover 3.5 km representing the remaining distance. The ratio between two poles is 1.026. Determine the location for pole number 10 of the new geometric progression model and the approximaa) Transport vehicles leaving the port with containers must have the containers tagged based on weight, either blue or red. It is observed for one vehicle the load was 7 Tons it had 3 red tagged container and 2 blue tagged container. Another vehicle had 2 red tagged containers and 3 blue tagged container and carried a weight of 8 Tons. What is the weight of the individual blue and red tagged container? b) In an Arithmetic Progression the 8th term plus the 4th term equals the 13th term. If the 18th term is 76 what is the sum of the first 20 terms.?Request explain how does a sphere contain infinite xn , how do diagonal elements give a cauchy sequence and step 3
- 2.. A sari-sari store sells P1000.00 worth of products during the first week. The owner of the store has set a goal of increasing his weekly sales by P300.00 each week for the next 10 weeks. If we assume that this goal is met, find the total sales during the first 11 weeks of his store.Second Stage Infinite SequencesThe first week, a patient engages in various exercies for 4 minutes every hour while awake. For each week after the first week, the exercies time increases by 3 minutes. Model the time spent exercising each hour while awake for a given week using a sequence, expressed in nth term form. Use this model to predict the amount of time spent exercising each hour after 10 weeks.
- 4. Now let r = 4. Calculate the first 100 sequence values and generate a cobweb diagram. What is the longterm behavior in this case?Find using generating function from discrete mathematics to solve the sequence. Help me fast....I will give Upvote.....Multiplier Suppose that, throughout the U.S. economy,individuals spend 90% of every additional dollar that theyearn. Economists would say that an individual’s marginalpropensity to consume is 0.90. For example, if Jane earns anadditional dollar, she will spend 0.9112 = $0.90 of it. Theindividual who earns $0.90 (from Jane) will spend 90% of it,or $0.81. This process of spending continues and results in aninfinite geometric series as follows : 1, 0.90, 0.902 , 0.903 , 0.904 ,.....The sum of this infinite geometric series is called the multiplier. What is the multiplier if individuals spend 90% of every additional dollar that they earn?
