Mathematics, 03.07.2019 21:20 Tonilynnpinto63
Below, we give a proof of the first inequality. we begin with the left side and substitute to get (k+1)a2. then, we expand the product, we substitute c1'g(k) for ka2. next, we use the inequality for the kth case. for the next step, we substitute the value of f(k) and simplify. then, we use the fact that 3ki/21 > k/2, for k greater than or equal to 2. finally, we observe that this is equal to f(k+1) to complete the proof. prove that 2(k 1) k +1 = cg(k) + 2k + 1 2 f(k) 2k+1 12 3h 12 k = f(k + 1) the second ineguality is nroven helow again we heain with the left-side suhstitute and exnand the nroduct for the next sten
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Mathematics, 21.06.2019 12:30
The diagram shows a 7cm by 6cm rectangle based pyramid. all the diagonal sides - ta, tb, tc and td are length 10cm. m is midpoint of rectangular base. work out height mt to 1 decimal place
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Mathematics, 21.06.2019 19:00
Aplot of land has been surveyed for a new housing development with borders ab, bc, dc, and da. the plot of land is a right trapezoid with a height of 60 feet and an opposite leg length of 65 feet
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Mathematics, 21.06.2019 19:10
What is the quotient? x+5/ 3x²+4x+5 © 3x2 – 11 + x + s 3x – 11 + 60 x + 5 o 3x2 - 11 - 50 x + 5 3x – 11 - - x + 5
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Mathematics, 21.06.2019 20:00
Someone answer asap for ! max recorded the heights of 500 male humans. he found that the heights were normally distributed around a mean of 177 centimeters. which statements about max’s data must be true? a. the median of max’s data is 250 b. more than half of the data points max recorded were 177 centimeters. c. a data point chosen at random is as likely to be above the mean as it is to be below the mean. d. every height within three standard deviations of the mean is equally likely to be chosen if a data point is selected at random.
Answers: 1
Below, we give a proof of the first inequality. we begin with the left side and substitute to get (k...
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