$I'm \: assuming \: you \: meant \: "group." \: Draw \: your \: 3 \: circles \: for \: apples, \: bananas, \: and \: cherries \: with \: overlap \: of \: all \: three \: with \: each \: other \: and \: make \: sure \: there \: is \: overlap \: between \: each \: two \: circles \: as \: well. \: Note \: your \: total = 38 + 42 + 14 = 94 \: (necessary \: to \: calculate \: the \: probability) \: is \: greater \: than \: the \: 80 \: people \: surveyed. \: Unfortunately, \: I \: cannot \: draw \: it \: here \: for \: you. \: There \: does \: appear \: to \: be \: a \: problem \: with \: the \: total \: number \: of \: those \: who \: like \: cherries, \: as \: well. \: It \: can't \: be \: 14 \: with \: the \: overlap \: with \: other \: fruit \: likes, \: so \: check \: the \: number \: again. \: Even \: if \: I \: were \: to \: assume \: the \: 6 \: that \: like \: all \: 3 \: fruits \: included \: , for \: example, \: those \: that \: like \: apples \: and \: bananas \: (meaning \: those \: that \: strictly \: like \: apples \: and \: bananas \: = 20 - 6 = 14), \: my \: total \: using \: this \: approach \: would \: be \: 64, \: not \: 80. \: After \: verifying \: the \: question, \: to \: find \: those \: that \: simply \: like \: one \: fruit, \: subtract \: the \: numbers \: that \: overlap \: from \: the \: total \: (using \: your \: original \: data, \: you \: should \: get \: 6 \: people \: like \: only \: apples, \: and \: 6 \: like \: only \: bananas). \: So \: the \: probability \: of \: those \: who \: like \: either \: apples \: or \: bananas \: would \: be \: 6 + 6 / 94 (or 12 / 94) if \: the \: numbers \: were \: correct \: for \: the \: cherry \: fans.$

7 0

3 years ago

The sum of two numbers is 13, the difference is 4. What are the numbers?.

Rama09 [41]

Answer:

a = 8.5

b = 4.5

Step-by-step explanation:

let 2 number be a ,b

a + b = 13 (1)

a - b = 4 (2)

(1) + (2) = 2a = 13+4 = 17 -> a = 8.5

-> b = 8.5 -4 = 4.5

6 0

3 years ago

How do you solve this problem in the photo?

Klio2033 [76]

Answer: 5^2

Step-by-step explanation:

Since the base are all the same, you will add the exponents and let the exponents stay the same.

5^3 * 5^4= 5^7 * 5^-5= 5^2

6 0

3 years ago

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What is the first 5 multiples of the following numbers 10,15,20,24​

What is the first 5 multiples of the following numbers 10,15,20,24