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2 years ago

Gina bought one pound of cheese and used of it.

Mathematics

2 answers:

kaheart [24]2 years ago

8 0

Answer: 1p/5

Step-by-step explanation:

larisa86 [58]2 years ago

5 0

Answer:

Gina will eat pound cheese for lunch each day

Explanation

Amount of cheese bought = 1 pound and the amount of cheese used = pound

So, the remaining amount of cheese

As this pound cheese is splitting into 5 equal parts, so the amount of each part will be: ÷ 5 = × = pound

So, Gina will eat pound cheese for lunch each day.

Step-by-step explanation:

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3.3333 as a simplified fraction

Irina18 [472]

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2 years ago

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1 year ago

Kaia's mom is having triplets. Each baby could be either male or female

fiasKO [112]

Answer:

MMM

Step-by-step explanation:

Given

See attachment for elements of the sample space (in a probability tree)

Required

Which of MMM, FFM, MFF, FMF represents more than one male?

From the question, we understand that:

$M \to Male$

$F \to Female$

So, for an event to represent more than 1 male, there must be an occurrence of at least 2 M (i.e 2 M or 3 M)

From the given options, only MMM has more than 1 M.

Hence, MMM represents more than one Male

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2 years ago

Justin says that if the diameter of any circle is 15 feet then its radius must 10

mixer [17]

I know this one give me like 5 minutes

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2 years ago

Find the probability that a randomly generated bit string of length 10 does not contain a 0 if bits are independent and if a 0 b

jeka94

Answer:

Step-by-step explanation:

From the given information; Let's assume that R should represent the set of all possible outcomes generated from a bit string of length 10 .

So; as each place is fitted with either 0 or 1

$\mathbf{|R|= 2^{10}}$

Similarly; the event E signifies the randomly generated bit string of length 10 does not contain a 0

Now;

if a 0 bit and a 1 bit are equally likely

The probability that a randomly generated bit string of length 10 does not contain a 0 if bits are independent and if a 0 bit and a 1 bit are equally likely is;

$\mathbf{P(E) = \dfrac{|E|}{|R|}}$

so ; if bits string should not contain a 0 and all other places should be occupied by 1; Then:

$\mathbf{{|E|}=1 }$ ; $\mathbf{|R|= 2^{10}}$

$\mathbf{P(E) = \dfrac{1}{2^{10}}}$

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2 years ago