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IB Questionbank Test Dear IB Math Studies SL Year 2 Students, We have covered chapter 1 (number and algebra 1), chapter 2 (descriptive statistics), chapter 5 (statistical applications), chapter 7 (number and algebra 2) and chapter 9 (logic) during your first year in IB Math Studies SL. To be ready for the first day in your second year in math studies, certain concepts taught on your first year need to be reviewed. Remember that the finals exam especially the IB exams (paper 1 and 2) will cover all topics from chapters 1 through 10. To prepare you, the attached worksheet needs to be completed over the summer. It is to be turned in on the first day of class and will count as your first quiz grade. You need to solve them completely – showing your steps along the way. If just an answer is given without any work to accompany it, it will not receive credit. Any graphing needs to be done on actual graph paper (with a ruler – no freehand graphs!) Graphs not done on graph paper will receive no credit. Do NOT put multiple problems in the same graph unless told to do so. Late work loses 10% per school day it is late. Please do not hesitate to e-mail me at [email protected], if you have questions or concerns. However, please know that I will have professional development workshop for the months of June to July so I will not be able to quickly respond but you will definitely receive a reply between 24-48 hours. Have a great summer and good luck! Thanks, Mr. Mallari 1 IB Math Studies SL Year 2 - Summer Work Name: ___________________________________________ Date: ___________________ Score: __________ 1a. [2 marks] In this question give all answers correct to two decimal places. Javier takes 5000 US dollars (USD) on a business trip to Venezuela. He exchanges 3000 USD into Venezuelan bolívars (VEF). The exchange rate is 1 USD 6.3021 VEF. Calculate the amount of VEF that Javier receives. 1b. [4 marks] During his time in Venezuela, Javier spends 1250 USD and 12 000 VEF. On his return home, Javier exchanges his remaining VEF into USD. The exchange rate is 1 USD 8.7268 VEF. Calculate the total amount, in USD, that Javier has remaining from his 5000 USD after his trip to Venezuela. 2a. [2 marks] A hospital collected data from 1000 patients in four hospital wards to review the quality of its healthcare. The data, showing the number of patients who became infected during their stay in hospital, was recorded in the following table. A -test was performed at the 5% significance level. The critical value for this test is 7.815. The null hypothesis for the test is : Becoming infected during a stay in the hospital is independent of the ward. Find the expected frequency of the patients who became infected whilst in Nightingale ward. 2 2b. [2 marks] For this test, write down the statistic. 2c. [2 marks] State, giving a reason, whether the null hypothesis should be rejected. 3a. [2 marks] A hydraulic hammer drives a metal post vertically into the ground by striking the top of the post. The distance that the post is driven into the ground, by the strike of the hammer, is . The distances form a geometric sequence. The distance that the post is driven into the ground by the first strike of the hammer, , is 64 cm. The distance that the post is driven into the ground by the second strike of the hammer, , is 48 cm. Find the value of the common ratio for this sequence. 3b. [2 marks] Find the distance that the post is driven into the ground by the eighth strike of the hammer. 3c. [2 marks] Find the total depth that the post has been driven into the ground after 10 strikes of the hammer. 4a. [2 marks] On a work day, the probability that Mr. Van Winkel wakes up early is . If he wakes up early, the probability that he is on time for work is . If he wakes up late, the probability that he is on time for work is . Complete the tree diagram below. 3 4b. [4 marks] The probability that Mr. Van Winkel arrives on time for work is . Find the value of . 5a. [5 marks] A group of 66 people went on holiday to Hawaii. During their stay, three trips were arranged: a boat trip ( ), a coach trip ( ) and a helicopter trip ( ). From this group of people: 3 went on all three trips; 16 went on the coach trip only; 13 went on the boat trip only; 5 went on the helicopter trip only; x went on the coach trip and the helicopter trip but not the boat trip; 2x went on the boat trip and the helicopter trip but not the coach trip; 4x went on the boat trip and the coach trip but not the helicopter trip; 8 did not go on any of the trips. Draw a Venn diagram to represent the given information, using sets labelled , and . 5b. [2 marks] Show that . 5c. [1 mark] Write down the value of . 5d. [4 marks] One person in the group is selected at random. Find the probability that this person (i) went on at most one trip; (ii) went on the coach trip, given that this person also went on both the helicopter trip and the boat trip. 4 6a. [1 mark] In a school 160 students sat a mathematics examination. Their scores, given as marks out of 90, are summarized on the cumulative frequency diagram. Write down the median score. 6b. [2 marks] The lower quartile of these scores is 40. Find the interquartile range. 6c. [3 marks] The lowest score was 6 marks and the highest score was 90 marks. Draw a box-and-whisker diagram on the grid below to represent the students’ examination scores. 5 7a. [2 marks] One of the locations in the Olympic Games is an amphitheatre. The number of seats in the first row of the amphitheatre, , is . The number of seats in each subsequent row forms an arithmetic sequence. The number of seats in the sixth row, , is . Calculate the value of the common difference, . 7b. [2 marks] There are rows in the amphitheatre. Find the total number of seats in the amphitheatre. 7c. [2 marks] Anisha visits the amphitheatre. She estimates that the amphitheatre has seats. Calculate the percentage error in Anisha’s estimate. 8a. [2 marks] In this question give all answers correct to the nearest whole number. Loic travelled from China to Brazil. At the airport he exchanged 3100 Chinese Yuan, , to Brazilian Real, , at an exchange rate of . No commission was charged. Calculate the amount of he received. 6 8b. [4 marks] When he returned to China, Loic changed his remaining at a bank. The exchange rate at the bank was and a commission of was charged. He received . i) Calculate the amount of Loic would have received if no commission was charged. ii) Calculate the amount of Loic exchanged when he returned to China. 9a. [1 mark] The manager of a travel agency surveyed 1200 travellers. She wanted to find out whether there was a relationship between a traveller’s age and their preferred destination. The travellers were asked to complete the following survey. A test was carried out, at the significance level, on the data collected. Write down the null hypothesis. 9b. [2 marks] Find the number of degrees of freedom. 9c. [1 mark] The critical value of this test is . Use this information to write down the values of the statistic for which the null hypothesis is rejected. 9d. [2 marks] From the travellers taking part in the survey, 285 were 61 years or older and 420 preferred Tokyo. Calculate the expected number of travellers who preferred Tokyo and were 61 years or older. 7 10. [6 marks] Consider the numbers and . Complete the following table by placing a tick ( ) to indicate if the number is an element of the number set. The first row has been completed as an example. 11a. [2 marks] The IB grades attained by a group of students are listed as follows. Find the median grade. 11b. [2 marks] Calculate the interquartile range. 11c. [2 marks] Find the probability that a student chosen at random from the group scored at least a grade . 8 12a. [3 marks] The second term of an arithmetic sequence is 30. The fifth term is 90. Calculate (i) the common difference of the sequence; (ii) the first term of the sequence. 12b. [3 marks] The first, second and fifth terms of this arithmetic sequence are the first three terms of a geometric sequence. Calculate the seventh term of the geometric sequence. 13a. [2 marks] Aleph has an unbiased cubical (six faced) die on which are written the numbers 1 , 2 , 3 , 4 , 5 and 6. Beth has an unbiased tetrahedral (four faced) die on which are written the numbers 2 , 3 , 5 and 7. Complete the Venn diagram with the numbers written on Aleph’s die ( ) and Beth’s die ( ). 13b. [2 marks] Find . 13c. [2 marks] Aleph and Beth are each going to roll their die once only. Shin says the probability that each die will show the same number is . Determine whether Shin is correct. Give a reason. 9 14a. [1 mark] Peter either walks or cycles to work. The probability that he walks is 0.25. If Peter walks to work, the probability that he is late is 0.1. If he cycles to work, the probability that he is late is 0.05.
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