Tutors Answer Your Questions about Probability-and-statistics (FREE)
Question 478723: (8.62) In 1992, the FAA conducted 20,000 pre-employment drug tests on job applicants who were to be engaged in safety and security-related jobs, and found that 1000 were positive.
(a) Construct a 95 percent confidence interval for the population proportion of positive drug tests.
(b) May you assume that this is a normal distribution? Explain why. (Check the normality of your proportion!)
Click here to see answer by stanbon(75887)  |
Question 478722: (8.46) A random sample of 10 miniature Tootsie Rolls was taken from a bag. Each piece was weighed on a very accurate scale. The results in grams were
3.18
3.21
3.15
3.42
3.23
3.36
3.47
3.29
3.37
3.40
(a) Construct a 95 percent confidence interval for the true mean weight.
(b) What sample size would be necessary to estimate the true weight with an error of ± 0.01 grams with 99 percent confidence? (Hint: Use sample size calculation for means.)
(c) What factors might cause variation in the weight of Tootsie Rolls during manufacture?
Click here to see answer by stanbon(75887) |
Question 478909: Dear Math teacher,
Could you help me please with the following problem?
Three cards are drawn from a pack of 52, each card being replaced before the next one is drawn. Compute the probability p that all are spades. A pack of 52 cards includes 13 spades.
Here is how I did it:
p = 13C3 / 52C3 = 286/22,100 = 0.0129 or 1.29%. However, this is NOT the right answer. My textbook's solution is solved like this: (13/52)^3 = 1/64 = 0.0156 or 1.56%.
Please let me know why my way does NOT give me the right answer.
Thank you so much as always.
Yours sincerely,
Ivanka
Click here to see answer by ewatrrr(24785)  |
Question 478909: Dear Math teacher,
Could you help me please with the following problem?
Three cards are drawn from a pack of 52, each card being replaced before the next one is drawn. Compute the probability p that all are spades. A pack of 52 cards includes 13 spades.
Here is how I did it:
p = 13C3 / 52C3 = 286/22,100 = 0.0129 or 1.29%. However, this is NOT the right answer. My textbook's solution is solved like this: (13/52)^3 = 1/64 = 0.0156 or 1.56%.
Please let me know why my way does NOT give me the right answer.
Thank you so much as always.
Yours sincerely,
Ivanka
Click here to see answer by stanbon(75887) |
Question 478952: Nine tickets, numbered from 1 to 9, are in a box. If 2 tickets are drawn at random, determine the probability p that both are odd.
Here is how I did it:
P (2 tickets = odd, 9 tickets)
5 odd
9 tickets
P (2 tickets = odd, 9 tickets) = desired outcome/total outcome = (5/9) times (5/9) = (5/9)^2 = 25/81 = 0.3086 = 0.31
However, this is NOT the correct answer. My textbook says this:
5C2/9C2 = 5/18 = 0.28
Please note I would have solved this problem the textbook's way; yet, in a similar problem, I solved it the textbook's way and the book solved it the way I did in this problem. So, I corrected myself to proceed through the calculations as stated in my book. Now, the book switched on me. I don't know what is A DIFFERENCE between the two versions of the calculation. Percentages are slightly off, and I assume that my answer must be wrong since a slight difference in math means a huge gap.
If you do not mind, here is the similar problem I am referring to above: Three cards are drawn from a pack of 52 cards, each card being replaced before the next one is drawn. Compute the probability p that all are spades.
Here is how I did it: 13C3/52C3 = 0.0129 = 1.29 %
Here is how the textbook did it: (13/52)times(13/52)times(13/52) = (13/52)^3 = 0.0156 = 1.56%.
As you notice, the percentages are again just slightly off but still two different values. Please let me what am I missing? What is it that I solve the problem through combinations vs. (desired outcome/total outcome)^(number of drawings)?
Thank you very much for your time and advice. I really appreciate it. Have a beautiful and safe evening.
Respectfully,
Ivanka
Click here to see answer by Earlsdon(6294) |
Question 478952: Nine tickets, numbered from 1 to 9, are in a box. If 2 tickets are drawn at random, determine the probability p that both are odd.
Here is how I did it:
P (2 tickets = odd, 9 tickets)
5 odd
9 tickets
P (2 tickets = odd, 9 tickets) = desired outcome/total outcome = (5/9) times (5/9) = (5/9)^2 = 25/81 = 0.3086 = 0.31
However, this is NOT the correct answer. My textbook says this:
5C2/9C2 = 5/18 = 0.28
Please note I would have solved this problem the textbook's way; yet, in a similar problem, I solved it the textbook's way and the book solved it the way I did in this problem. So, I corrected myself to proceed through the calculations as stated in my book. Now, the book switched on me. I don't know what is A DIFFERENCE between the two versions of the calculation. Percentages are slightly off, and I assume that my answer must be wrong since a slight difference in math means a huge gap.
If you do not mind, here is the similar problem I am referring to above: Three cards are drawn from a pack of 52 cards, each card being replaced before the next one is drawn. Compute the probability p that all are spades.
Here is how I did it: 13C3/52C3 = 0.0129 = 1.29 %
Here is how the textbook did it: (13/52)times(13/52)times(13/52) = (13/52)^3 = 0.0156 = 1.56%.
As you notice, the percentages are again just slightly off but still two different values. Please let me what am I missing? What is it that I solve the problem through combinations vs. (desired outcome/total outcome)^(number of drawings)?
Thank you very much for your time and advice. I really appreciate it. Have a beautiful and safe evening.
Respectfully,
Ivanka
Click here to see answer by Theo(13342)  |
Question 478970: The table shows the number of employed and unemployed workers in the United States in thousands in 2000. Assume that one person will be randomly selected from the group described in the table. Find the probability of selecting a person who is employed given that the person is male.
In the table are these #'s under these headings from Left to Right.
Employed******/*********Unemployed
Male 67761*********/*********2433
Female 58655*********/*********2285
I have tried dividing only the males who are employed by the unemployed males but do not know if that is correct or not. Thank you for your time.
Click here to see answer by stanbon(75887) |
Question 478970: The table shows the number of employed and unemployed workers in the United States in thousands in 2000. Assume that one person will be randomly selected from the group described in the table. Find the probability of selecting a person who is employed given that the person is male.
In the table are these #'s under these headings from Left to Right.
Employed******/*********Unemployed
Male 67761*********/*********2433
Female 58655*********/*********2285
I have tried dividing only the males who are employed by the unemployed males but do not know if that is correct or not. Thank you for your time.
Click here to see answer by Theo(13342) |
Question 478984: Ok....You helped answer a question previously and it really helped. Do you think that you can help to explain what I am looking at here and help to apply a formula...I am drawing a blank.
If you are dealt 4 cards from a shuffled deck of 52 cards, find the probability of getting three aces and one king.
I serioulsy don't know where to start. Thank you for your time.
Click here to see answer by stanbon(75887) |
Question 478984: Ok....You helped answer a question previously and it really helped. Do you think that you can help to explain what I am looking at here and help to apply a formula...I am drawing a blank.
If you are dealt 4 cards from a shuffled deck of 52 cards, find the probability of getting three aces and one king.
I serioulsy don't know where to start. Thank you for your time.
Click here to see answer by Theo(13342) |
Question 478969: A manufacturer claims that the mean lifetime, , of its light bulbs is months. The standard deviation of these lifetimes is months. Ninety bulbs are selected at random, and their mean lifetime is found to be months. Can we conclude, at the level of significance, that the mean lifetime of light bulbs made by this manufacturer differs from months?
Perform a two-tailed test. Then fill in the table below.
Carry your intermediate computations to at least three decimal places, and round your responses as specified in the table. (If necessary, consult a list of formulas.)
Click here to see answer by stanbon(75887) |
Question 478988: Smallville Bank has 650 checking accounts. A recent sample of 50 of these customers showed 26 have a Visa card with the bank. Construct a 99% or .99 confidence interval for the proportion of checking account customers who have a Visa account with the bank.
Click here to see answer by stanbon(75887) |
Question 478987: The Human Relations Department of Smallville Co. would like to include a dental plan as part of its benefits package. The question is, how much does a typical employee and his/her family spend on annual dental expenses? A sample of 45 employees reveals the mean amount spent last year was $1,820 with a standard deviation of $660. Assume a normal distribution of annual dental expenses.
A) Construct a 95% or .95 confidence interval estimate for the population mean.
B) The information from part A, above, was given to the President who indicated the Company could afford $1,700 per year. Is it possible the population mean could be $1,700? Justify your answer.
Click here to see answer by stanbon(75887) |
Question 478994: A box contains 5 red balls and 10 blue balls. A) How many samples of 3 balls are possible? B) How many samples will have all red balls? C) What is the probability the sample will have 3 red balls? D)What are the odds in favor of drawing a blue ball?
Click here to see answer by stanbon(75887) |
Question 479070: In a game of change if you purchase one ticket out of the 100 tickets being sold at a cost of $5.00 how much money would you expect to win taking into consideration the cost of the ticket. The winning prize is $500?
If I purchase two tickets instead of one ticket at the same cost of $5.00 each, how much money would I expect to win, taking into consideration the cost of the tickets if the winning prize is $500.
Which of these games, if any, are fair?
Click here to see answer by stanbon(75887) |
Question 479070: In a game of change if you purchase one ticket out of the 100 tickets being sold at a cost of $5.00 how much money would you expect to win taking into consideration the cost of the ticket. The winning prize is $500?
If I purchase two tickets instead of one ticket at the same cost of $5.00 each, how much money would I expect to win, taking into consideration the cost of the tickets if the winning prize is $500.
Which of these games, if any, are fair?
Click here to see answer by robertb(5830)  |
Question 479038: How many ways can 7 people line up for play tickets?
I have been trying to figure this problem out with the sample space and I'm not sire if that is the right way to go about this...please if you can help explain the correct procedure for this problem I would like to try to get the answer myself.
Thank you
Jennifer
Click here to see answer by Tatiana_Stebko(1539)  |
Question 479074: According to the U.S National Center for Health Statistics, the mean height for adult American males is μ=65.0 inches. Assume the heights are normally distributed with standard deviation of σ=3.0.
(I NEED HELP WITH PART C&D..... I INCLUDE PART A&B BECAUSE I WASN'T SURE IF YOU NEED THE INFORMATION TO COMPLETE THE OTHER PARTS.)
Determine the probability of finding an adult American male that is:
a) Less than or equal to 69.5 inches tall. .answer: .9332
b) Between 69.5 and 65.0 inches tall. answer: .4332
c) How tall must an American male be to be in the top 5% of the adult American male population?
d) About 95.44% of the adult males are between
_________ and___________ inches tall.
Click here to see answer by Theo(13342) |
Question 479288: The water quality is acceptable if the mean amount of suspended solids is less than 49. Construct an α= .05 test to establish that the quality is acceptable.
(a)Specify H0 and H1.
(b)State the test statistic.
(c)What does the test conclude?
Click here to see answer by stanbon(75887) |
|
Older solutions: 1..45, 46..90, 91..135, 136..180, 181..225, 226..270, 271..315, 316..360, 361..405, 406..450, 451..495, 496..540, 541..585, 586..630, 631..675, 676..720, 721..765, 766..810, 811..855, 856..900, 901..945, 946..990, 991..1035, 1036..1080, 1081..1125, 1126..1170, 1171..1215, 1216..1260, 1261..1305, 1306..1350, 1351..1395, 1396..1440, 1441..1485, 1486..1530, 1531..1575, 1576..1620, 1621..1665, 1666..1710, 1711..1755, 1756..1800, 1801..1845, 1846..1890, 1891..1935, 1936..1980, 1981..2025, 2026..2070, 2071..2115, 2116..2160, 2161..2205, 2206..2250, 2251..2295, 2296..2340, 2341..2385, 2386..2430, 2431..2475, 2476..2520, 2521..2565, 2566..2610, 2611..2655, 2656..2700, 2701..2745, 2746..2790, 2791..2835, 2836..2880, 2881..2925, 2926..2970, 2971..3015, 3016..3060, 3061..3105, 3106..3150, 3151..3195, 3196..3240, 3241..3285, 3286..3330, 3331..3375, 3376..3420, 3421..3465, 3466..3510, 3511..3555, 3556..3600, 3601..3645, 3646..3690, 3691..3735, 3736..3780, 3781..3825, 3826..3870, 3871..3915, 3916..3960, 3961..4005, 4006..4050, 4051..4095, 4096..4140, 4141..4185, 4186..4230, 4231..4275, 4276..4320, 4321..4365, 4366..4410, 4411..4455, 4456..4500, 4501..4545, 4546..4590, 4591..4635, 4636..4680, 4681..4725, 4726..4770, 4771..4815, 4816..4860, 4861..4905, 4906..4950, 4951..4995, 4996..5040, 5041..5085, 5086..5130, 5131..5175, 5176..5220, 5221..5265, 5266..5310, 5311..5355, 5356..5400, 5401..5445, 5446..5490, 5491..5535, 5536..5580, 5581..5625, 5626..5670, 5671..5715, 5716..5760, 5761..5805, 5806..5850, 5851..5895, 5896..5940, 5941..5985, 5986..6030, 6031..6075, 6076..6120, 6121..6165, 6166..6210, 6211..6255, 6256..6300, 6301..6345, 6346..6390, 6391..6435, 6436..6480, 6481..6525, 6526..6570, 6571..6615, 6616..6660, 6661..6705, 6706..6750, 6751..6795, 6796..6840, 6841..6885, 6886..6930, 6931..6975, 6976..7020, 7021..7065, 7066..7110, 7111..7155, 7156..7200, 7201..7245, 7246..7290, 7291..7335, 7336..7380, 7381..7425, 7426..7470, 7471..7515, 7516..7560, 7561..7605, 7606..7650, 7651..7695, 7696..7740, 7741..7785, 7786..7830, 7831..7875, 7876..7920, 7921..7965, 7966..8010, 8011..8055, 8056..8100, 8101..8145, 8146..8190, 8191..8235, 8236..8280, 8281..8325, 8326..8370, 8371..8415, 8416..8460, 8461..8505, 8506..8550, 8551..8595, 8596..8640, 8641..8685, 8686..8730, 8731..8775, 8776..8820, 8821..8865, 8866..8910, 8911..8955, 8956..9000, 9001..9045, 9046..9090, 9091..9135, 9136..9180, 9181..9225, 9226..9270, 9271..9315, 9316..9360, 9361..9405, 9406..9450, 9451..9495, 9496..9540, 9541..9585, 9586..9630, 9631..9675, 9676..9720, 9721..9765, 9766..9810, 9811..9855, 9856..9900, 9901..9945, 9946..9990, 9991..10035, 10036..10080, 10081..10125, 10126..10170, 10171..10215, 10216..10260, 10261..10305, 10306..10350, 10351..10395, 10396..10440, 10441..10485, 10486..10530, 10531..10575, 10576..10620, 10621..10665, 10666..10710, 10711..10755, 10756..10800, 10801..10845, 10846..10890, 10891..10935, 10936..10980, 10981..11025, 11026..11070, 11071..11115, 11116..11160, 11161..11205, 11206..11250, 11251..11295, 11296..11340, 11341..11385, 11386..11430, 11431..11475, 11476..11520, 11521..11565, 11566..11610, 11611..11655, 11656..11700, 11701..11745, 11746..11790, 11791..11835, 11836..11880, 11881..11925, 11926..11970, 11971..12015, 12016..12060, 12061..12105, 12106..12150, 12151..12195, 12196..12240, 12241..12285, 12286..12330, 12331..12375, 12376..12420, 12421..12465, 12466..12510, 12511..12555, 12556..12600, 12601..12645, 12646..12690, 12691..12735, 12736..12780, 12781..12825, 12826..12870, 12871..12915, 12916..12960, 12961..13005, 13006..13050, 13051..13095, 13096..13140, 13141..13185, 13186..13230, 13231..13275, 13276..13320, 13321..13365, 13366..13410, 13411..13455, 13456..13500, 13501..13545, 13546..13590, 13591..13635, 13636..13680, 13681..13725, 13726..13770, 13771..13815, 13816..13860, 13861..13905, 13906..13950, 13951..13995, 13996..14040, 14041..14085, 14086..14130, 14131..14175, 14176..14220, 14221..14265, 14266..14310, 14311..14355, 14356..14400, 14401..14445, 14446..14490, 14491..14535, 14536..14580, 14581..14625, 14626..14670, 14671..14715, 14716..14760, 14761..14805, 14806..14850, 14851..14895, 14896..14940, 14941..14985, 14986..15030, 15031..15075, 15076..15120, 15121..15165, 15166..15210, 15211..15255, 15256..15300, 15301..15345, 15346..15390, 15391..15435, 15436..15480, 15481..15525, 15526..15570, 15571..15615, 15616..15660, 15661..15705, 15706..15750, 15751..15795, 15796..15840, 15841..15885, 15886..15930, 15931..15975, 15976..16020, 16021..16065, 16066..16110, 16111..16155, 16156..16200, 16201..16245, 16246..16290, 16291..16335, 16336..16380, 16381..16425, 16426..16470, 16471..16515, 16516..16560, 16561..16605, 16606..16650, 16651..16695, 16696..16740, 16741..16785, 16786..16830, 16831..16875, 16876..16920, 16921..16965, 16966..17010, 17011..17055, 17056..17100, 17101..17145, 17146..17190, 17191..17235, 17236..17280, 17281..17325, 17326..17370, 17371..17415, 17416..17460, 17461..17505, 17506..17550, 17551..17595, 17596..17640, 17641..17685, 17686..17730, 17731..17775, 17776..17820, 17821..17865, 17866..17910, 17911..17955, 17956..18000, 18001..18045, 18046..18090, 18091..18135, 18136..18180, 18181..18225, 18226..18270, 18271..18315, 18316..18360, 18361..18405, 18406..18450, 18451..18495, 18496..18540, 18541..18585, 18586..18630, 18631..18675, 18676..18720, 18721..18765, 18766..18810, 18811..18855, 18856..18900, 18901..18945, 18946..18990, 18991..19035, 19036..19080, 19081..19125, 19126..19170, 19171..19215, 19216..19260, 19261..19305, 19306..19350, 19351..19395, 19396..19440, 19441..19485, 19486..19530, 19531..19575, 19576..19620, 19621..19665, 19666..19710, 19711..19755, 19756..19800, 19801..19845, 19846..19890, 19891..19935, 19936..19980, 19981..20025, 20026..20070, 20071..20115, 20116..20160, 20161..20205, 20206..20250, 20251..20295, 20296..20340, 20341..20385, 20386..20430, 20431..20475, 20476..20520, 20521..20565, 20566..20610, 20611..20655, 20656..20700, 20701..20745, 20746..20790, 20791..20835, 20836..20880, 20881..20925, 20926..20970, 20971..21015, 21016..21060, 21061..21105, 21106..21150, 21151..21195, 21196..21240, 21241..21285, 21286..21330, 21331..21375, 21376..21420, 21421..21465, 21466..21510, 21511..21555, 21556..21600, 21601..21645, 21646..21690, 21691..21735, 21736..21780, 21781..21825, 21826..21870, 21871..21915, 21916..21960, 21961..22005, 22006..22050, 22051..22095, 22096..22140, 22141..22185, 22186..22230, 22231..22275, 22276..22320, 22321..22365, 22366..22410, 22411..22455, 22456..22500, 22501..22545, 22546..22590, 22591..22635, 22636..22680, 22681..22725, 22726..22770, 22771..22815, 22816..22860, 22861..22905, 22906..22950, 22951..22995, 22996..23040, 23041..23085, 23086..23130, 23131..23175, 23176..23220, 23221..23265, 23266..23310, 23311..23355, 23356..23400, 23401..23445, 23446..23490, 23491..23535, 23536..23580, 23581..23625, 23626..23670, 23671..23715, 23716..23760, 23761..23805, 23806..23850, 23851..23895, 23896..23940, 23941..23985, 23986..24030, 24031..24075, 24076..24120, 24121..24165, 24166..24210, 24211..24255, 24256..24300, 24301..24345, 24346..24390, 24391..24435, 24436..24480, 24481..24525, 24526..24570, 24571..24615, 24616..24660, 24661..24705, 24706..24750, 24751..24795, 24796..24840, 24841..24885, 24886..24930, 24931..24975, 24976..25020, 25021..25065, 25066..25110, 25111..25155, 25156..25200, 25201..25245, 25246..25290, 25291..25335, 25336..25380, 25381..25425, 25426..25470, 25471..25515, 25516..25560, 25561..25605, 25606..25650, 25651..25695, 25696..25740, 25741..25785, 25786..25830, 25831..25875, 25876..25920, 25921..25965, 25966..26010, 26011..26055, 26056..26100, 26101..26145, 26146..26190, 26191..26235, 26236..26280, 26281..26325, 26326..26370, 26371..26415, 26416..26460, 26461..26505, 26506..26550, 26551..26595, 26596..26640, 26641..26685, 26686..26730, 26731..26775, 26776..26820, 26821..26865, 26866..26910, 26911..26955, 26956..27000, 27001..27045, 27046..27090, 27091..27135, 27136..27180, 27181..27225, 27226..27270, 27271..27315, 27316..27360, 27361..27405, 27406..27450, 27451..27495, 27496..27540, 27541..27585, 27586..27630, 27631..27675, 27676..27720, 27721..27765, 27766..27810, 27811..27855, 27856..27900, 27901..27945, 27946..27990, 27991..28035, 28036..28080, 28081..28125, 28126..28170, 28171..28215, 28216..28260, 28261..28305, 28306..28350, 28351..28395, 28396..28440, 28441..28485, 28486..28530, 28531..28575, 28576..28620, 28621..28665, 28666..28710, 28711..28755, 28756..28800, 28801..28845, 28846..28890, 28891..28935, 28936..28980, 28981..29025, 29026..29070, 29071..29115, 29116..29160, 29161..29205, 29206..29250, 29251..29295, 29296..29340, 29341..29385, 29386..29430, 29431..29475, 29476..29520, 29521..29565, 29566..29610, 29611..29655, 29656..29700, 29701..29745, 29746..29790, 29791..29835, 29836..29880, 29881..29925, 29926..29970, 29971..30015, 30016..30060, 30061..30105, 30106..30150, 30151..30195, 30196..30240, 30241..30285, 30286..30330, 30331..30375, 30376..30420, 30421..30465, 30466..30510, 30511..30555, 30556..30600, 30601..30645, 30646..30690, 30691..30735, 30736..30780, 30781..30825, 30826..30870, 30871..30915, 30916..30960, 30961..31005, 31006..31050, 31051..31095, 31096..31140, 31141..31185, 31186..31230, 31231..31275, 31276..31320, 31321..31365, 31366..31410, 31411..31455, 31456..31500, 31501..31545, 31546..31590, 31591..31635, 31636..31680, 31681..31725, 31726..31770, 31771..31815, 31816..31860, 31861..31905, 31906..31950, 31951..31995, 31996..32040, 32041..32085, 32086..32130, 32131..32175, 32176..32220, 32221..32265, 32266..32310, 32311..32355, 32356..32400, 32401..32445, 32446..32490, 32491..32535, 32536..32580, 32581..32625, 32626..32670, 32671..32715, 32716..32760, 32761..32805, 32806..32850, 32851..32895, 32896..32940, 32941..32985, 32986..33030, 33031..33075, 33076..33120, 33121..33165, 33166..33210, 33211..33255, 33256..33300, 33301..33345, 33346..33390, 33391..33435, 33436..33480, 33481..33525, 33526..33570, 33571..33615, 33616..33660, 33661..33705, 33706..33750, 33751..33795, 33796..33840, 33841..33885, 33886..33930, 33931..33975, 33976..34020, 34021..34065, 34066..34110, 34111..34155, 34156..34200, 34201..34245, 34246..34290, 34291..34335, 34336..34380, 34381..34425, 34426..34470, 34471..34515, 34516..34560, 34561..34605, 34606..34650, 34651..34695, 34696..34740, 34741..34785, 34786..34830, 34831..34875, 34876..34920, 34921..34965, 34966..35010, 35011..35055, 35056..35100, 35101..35145, 35146..35190, 35191..35235, 35236..35280, 35281..35325, 35326..35370, 35371..35415, 35416..35460, 35461..35505, 35506..35550, 35551..35595, 35596..35640, 35641..35685, 35686..35730, 35731..35775, 35776..35820, 35821..35865, 35866..35910, 35911..35955, 35956..36000, 36001..36045, 36046..36090, 36091..36135, 36136..36180, 36181..36225, 36226..36270, 36271..36315, 36316..36360, 36361..36405, 36406..36450, 36451..36495, 36496..36540, 36541..36585, 36586..36630, 36631..36675, 36676..36720, 36721..36765, 36766..36810, 36811..36855, 36856..36900, 36901..36945, 36946..36990, 36991..37035, 37036..37080, 37081..37125, 37126..37170, 37171..37215, 37216..37260, 37261..37305, 37306..37350, 37351..37395, 37396..37440, 37441..37485, 37486..37530, 37531..37575, 37576..37620, 37621..37665, 37666..37710, 37711..37755, 37756..37800, 37801..37845, 37846..37890, 37891..37935, 37936..37980, 37981..38025, 38026..38070, 38071..38115, 38116..38160, 38161..38205, 38206..38250, 38251..38295, 38296..38340, 38341..38385, 38386..38430, 38431..38475, 38476..38520, 38521..38565, 38566..38610, 38611..38655, 38656..38700, 38701..38745, 38746..38790, 38791..38835, 38836..38880, 38881..38925, 38926..38970, 38971..39015, 39016..39060, 39061..39105, 39106..39150, 39151..39195, 39196..39240, 39241..39285, 39286..39330, 39331..39375, 39376..39420, 39421..39465, 39466..39510, 39511..39555, 39556..39600, 39601..39645, 39646..39690, 39691..39735, 39736..39780, 39781..39825, 39826..39870, 39871..39915, 39916..39960, 39961..40005, 40006..40050, 40051..40095, 40096..40140, 40141..40185, 40186..40230, 40231..40275, 40276..40320, 40321..40365, 40366..40410, 40411..40455, 40456..40500, 40501..40545, 40546..40590, 40591..40635, 40636..40680, 40681..40725, 40726..40770, 40771..40815, 40816..40860, 40861..40905, 40906..40950, 40951..40995, 40996..41040, 41041..41085, 41086..41130, 41131..41175, 41176..41220, 41221..41265, 41266..41310, 41311..41355, 41356..41400, 41401..41445, 41446..41490, 41491..41535, 41536..41580, 41581..41625, 41626..41670, 41671..41715, 41716..41760, 41761..41805, 41806..41850, 41851..41895, 41896..41940, 41941..41985, 41986..42030, 42031..42075, 42076..42120, 42121..42165, 42166..42210, 42211..42255, 42256..42300, 42301..42345, 42346..42390, 42391..42435, 42436..42480, 42481..42525, 42526..42570, 42571..42615, 42616..42660, 42661..42705, 42706..42750, 42751..42795, 42796..42840, 42841..42885, 42886..42930, 42931..42975, 42976..43020, 43021..43065, 43066..43110, 43111..43155, 43156..43200, 43201..43245, 43246..43290, 43291..43335, 43336..43380, 43381..43425, 43426..43470, 43471..43515, 43516..43560, 43561..43605, 43606..43650, 43651..43695, 43696..43740, 43741..43785, 43786..43830, 43831..43875, 43876..43920, 43921..43965, 43966..44010, 44011..44055, 44056..44100, 44101..44145, 44146..44190, 44191..44235, 44236..44280, 44281..44325, 44326..44370, 44371..44415, 44416..44460, 44461..44505, 44506..44550, 44551..44595, 44596..44640, 44641..44685, 44686..44730, 44731..44775, 44776..44820, 44821..44865, 44866..44910, 44911..44955, 44956..45000, 45001..45045, 45046..45090, 45091..45135, 45136..45180, 45181..45225, 45226..45270, 45271..45315, 45316..45360, 45361..45405, 45406..45450, 45451..45495, 45496..45540, 45541..45585, 45586..45630, 45631..45675, 45676..45720, 45721..45765, 45766..45810, 45811..45855, 45856..45900, 45901..45945, 45946..45990, 45991..46035, 46036..46080, 46081..46125, 46126..46170, 46171..46215, 46216..46260, 46261..46305, 46306..46350, 46351..46395, 46396..46440, 46441..46485, 46486..46530, 46531..46575, 46576..46620, 46621..46665, 46666..46710, 46711..46755, 46756..46800, 46801..46845, 46846..46890, 46891..46935, 46936..46980, 46981..47025, 47026..47070, 47071..47115, 47116..47160, 47161..47205, 47206..47250, 47251..47295, 47296..47340, 47341..47385, 47386..47430, 47431..47475, 47476..47520, 47521..47565, 47566..47610, 47611..47655, 47656..47700, 47701..47745, 47746..47790, 47791..47835, 47836..47880, 47881..47925, 47926..47970, 47971..48015, 48016..48060, 48061..48105, 48106..48150, 48151..48195, 48196..48240, 48241..48285, 48286..48330, 48331..48375, 48376..48420, 48421..48465, 48466..48510, 48511..48555, 48556..48600, 48601..48645, 48646..48690, 48691..48735, 48736..48780, 48781..48825, 48826..48870, 48871..48915, 48916..48960, 48961..49005, 49006..49050, 49051..49095, 49096..49140, 49141..49185, 49186..49230, 49231..49275, 49276..49320, 49321..49365, 49366..49410, 49411..49455, 49456..49500, 49501..49545, 49546..49590, 49591..49635, 49636..49680, 49681..49725, 49726..49770, 49771..49815, 49816..49860, 49861..49905, 49906..49950, 49951..49995, 49996..50040, 50041..50085, 50086..50130, 50131..50175, 50176..50220, 50221..50265, 50266..50310, 50311..50355, 50356..50400, 50401..50445, 50446..50490, 50491..50535, 50536..50580, 50581..50625, 50626..50670, 50671..50715, 50716..50760, 50761..50805, 50806..50850, 50851..50895, 50896..50940, 50941..50985, 50986..51030, 51031..51075, 51076..51120, 51121..51165, 51166..51210, 51211..51255, 51256..51300, 51301..51345
|
