[Graphs generated by this script: setBorder(60,45,0,10); initPicture(0,20,0,0.29647548);axes(1000,0.05,1,1000,0.05); fill="blue"; stroke="black";textabs([215,0],"number of successes","above");rect([1,0],[3,0.05764801]);text([2,0],"0","below");rect([3,0],[5,0.19765032]);text([4,0],"1","below");rect([5,0],[7,0.29647548]);text([6,0],"2","below");rect([7,0],[9,0.25412184]);text([8,0],"3","below");rect([9,0],[11,0.1361367]);text([10,0],"4","below");rect([11,0],[13,0.04667544]);text([12,0],"5","below");rect([13,0],[15,0.01000188]);text([14,0],"6","below");rect([15,0],[17,0.00122472]);text([16,0],"7","below");rect([17,0],[19,6.561E-5]);text([18,0],"8","below");]

Use the above histogram of the binomial random variable to find the probability of success, p, where p is a multiple of 0.05.  

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