act math<\/a> section does not dive deep into probability concepts, so you’ll be fine knowing just the basics. take a look at the example problem below for some practice:<\/p>\na bag contains 2 purple marbles, 5 black marbles, and 5 blue marbles. you choose two marbles out of the bag at random. after the first marble is chosen, it is not replaced in the bag. what is the probability of choosing two purple marbles?<\/p>\n
a. 1\/66
\nb. 1\/6
\nc. 1\/36
\nd. 1\/16
\ne. 1\/26<\/p>\n
okay, there’s a lot of things going on here, so let’s break it down.<\/p>\n
1. first of all, let’s take stock of how many purple marbles and total marbles we have here.<\/p>\n
we have 2 purple marbles, and
\n2+5+5 = 12 marbles total. <\/p>\n
the probability of choosing the first purple marble is 2\/12.<\/p>\n
2. now let’s figure out the value of our second probability.<\/p>\n
since the first marble does not go back into the bag once it is chosen, we only have 11 marbles total for the second draw. <\/p>\n
whether or not we draw a purple marble the second time around only matters if we chose a purple marble the first time. what this means is that in order to figure out our second probability, we should assume that we picked a purple marble on our first draw. <\/p>\n
therefore, our second probability comes out to be 1\/11.<\/p>\n
3. since the problem is asking for the probability of drawing two purple marbles, we need to multiply the two values together.<\/p>\n
(2\/12) * (1\/11) = 2\/132<\/p>\n
all we need to do now is simplify, and our answer is a.
\n <\/p>\n","protected":false},"excerpt":{"rendered":"
chances are good that you’ve thought about probability before when playing games of chance. the higher the chances of coming out on top, the more likely you would be willing to play. for simple games, such as calling heads or tails on a coin flip, it’s easy to figure out what the chances are of […]<\/p>\n","protected":false},"author":158,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[90],"tags":[],"ppma_author":[24918],"acf":[],"yoast_head":"\n
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<\/p>\n