EXXONMOBIL OPERATIONS SELECTION BATTERY PRACTICE TEST This practice test gives you an opportunity to respond to the types of questions contained in the ExxonMobil Operations Pre-employment Selection Battery. The test battery is made up of five tests. Each test measures a different ability‚ or set of skills‚ that has been shown to be necessary to perform ExxonMobil Operations jobs. All of the tests contain multiple-choice questions‚ with four response options‚ labeled A‚
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Mass of solid (grams) 39.537 38.515 40.975 Volume of water (milliliters) 50.01 49.9 52.4 Volume of water and solid (milliliters) 54.9 54 57 Part III: Density of Regular-Shaped Solid Mass of solid (grams) 27.7 27.71 26.8 Length of solid (centimeters) 5.26 5 4.5 Width of solid (centimeters) 3 4 3.5 Height of solid (centimeters) 2.5 3 2 Part I: Density of Unknown Liquid 1. Calculate the mass of the liquid for each trial. (Subtract the
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285 | 42.345 | 42.577 | Volume of water (milliliters) | 51.00 | 50.95 | 52.90 | Volume of water and solid (milliliters) | 55.50 | 55.90 | 56.95 | Part III: Density of Regular-Shaped Solid | Mass of solid (grams) | 27.00 | 26.50 | 25.50 | Length of solid (centimeters) | 5.25 | 5.00 | 4.50 | Width of solid (centimeters) | 3.00 | 4.00 | 3.50 | Height of solid (centimeters) | 2.50 | 3.00 | 2.00 | Calculations Show all of your work for each of the following calculations and be careful
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Regents Practice Test 1 Integrated Algebra Part I: Multiple Choice 1. Expressed in simplest form‚ [1] 8a2 [2] 3a2 12a 3c is equivalent to: 4ac [3] 3a3 [4] 3a3c 6. The accompanying graph shows the high temperatures in Elmira‚ New York for a 5-day period in January. 2. Which trinomial is equivalent to (3x - 2)(x + 4)? [1] 3x2 + 10x + 8 [2] 3x2 - 10x - 8 [3] 3x2 + 10x - 8 [4] 3x2 - 10x + 8 Which statement describes the data? [1] median = mode [3] mean < mode [2] median = mean [4] mean
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MID – TERM ASSIGNMENT S S 2 MATHEMATICS 1. Calculate the lengths marked x and y in the figures below. Give your answers in surd form. (a) (b) 2. The top of a building 24m high is observed from the top and from the bottom of a vertical tree. The angles of elevation are found to be 45o and 60o respectively‚ find the height of the tree. 3. A box contain ten marbles‚ seven of which are black and three are red. Three marbles are drawn one after the other without replacement. Find
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Cardinal The Cardinal’s scientific name is cardinalis. The Cardinal’s wingspan is 12 inches. Their body is 8 ¾ inches in length. They only weight 1.6 oz. The male cardinal is bright red with a pointed crest on the top of his head. The female cardinal is brown with a little red on her head‚ wings and tail. The cardinal uses the perching feet to search for food. The beak is short‚ stout and red. They can pick the seeds up with their beak. The cardinal eats seeds‚ in sects‚ spiders
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boxes‚ he took a break and told his boss that he has only 15 more boxes to move. Which equation can be solved to find how many boxes Leroy moved before his break? a. | | c. | | b. | | d. | | ____ 4. A rectangle with an area of has a length that is 4 times the width. What is the width? (Round your answer to the nearest tenth.) a. | 5.6 cm | c. | 22.3 cm | b. | 11.1 cm | d. | 44.5 cm | ____ 5. The area of the rectangle shown is more than 72 square inches. Which inequality
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Perimeter = 2 ( length+width ) Volume = length * width * average depth Underground surface area = 2 ( length + width ) average depth + length * width Using these formula as basis‚ write a program that accepts the length‚ width and average depth measurements‚ and then calculates the perimeter‚ volume and underground surface area of the pool. In writing your program‚ make the following two calculations immediately after the input data has been entered: length*width and length + width. The results
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which means that CY‚ which is measured by half the same arc‚ equals 8/2. I An inspection of Figure 2 shows that the first condition is met‚ but the second condition is fulfilled only if the force exerted by the spring is proportional to its length. In other
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in such a way that its vertices would lie also at the midpoints of the sides of the second square. This process is continued infinitely. Find the sum of the areas of these infinite squares. 3.) A rectangle and a square have the same area. If the length of the side of the square is 6 units and the longest side of the rectangle is 5 more than the measure of the shorter side. Find the dimensions of the rectangle. 4.) Find the height of a parallelogram having sides 10 and 20 inches‚ and an included
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