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In a group of internet users, 600 people like only Explorer. The number of people who like only Firefox is 4/5 times the number of people who like only Explorer. The number of people who like Google is 30% more than the number of people who like only Firefox. The number of people who like only Google is 50 more than half the number of people who like Google. The number of people who like both Google and Firefox but not Explorer is half the number of people who like only Google.The number of people who like both Firefox and Explorer but not Google is 360 less than the number of people who like Google. The number of people who like both Firefox and Explorer but not Google is 8 times the number of people who like all the three browsers

How many people like all the three browsers?

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In a group of internet users, 600 people like only Explorer. The number of people who like only Firefox is 4/5 times the number of people who like only Explorer. The number of people who like Google is 30% more than the number of people who like only Firefox. The number of people who like only Google is 50 more than half the number of people who like Google. The number of people who like both Google and Firefox but not Explorer is half the number of people who like only Google.The number of people who like both Firefox and Explorer but not Google is 360 less than the number of people who like Google. The number of people who like both Firefox and Explorer but not Google is 8 times the number of people who like all the three browsers

How many people like Firefox?

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In a group of internet users, 600 people like only Explorer. The number of people who like only Firefox is 4/5 times the number of people who like only Explorer. The number of people who like Google is 30% more than the number of people who like only Firefox. The number of people who like only Google is 50 more than half the number of people who like Google. The number of people who like both Google and Firefox but not Explorer is half the number of people who like only Google.The number of people who like both Firefox and Explorer but not Google is 360 less than the number of people who like Google. The number of people who like both Firefox and Explorer but not Google is 8 times the number of people who like all the three browsers

The number of people who like both Google and Explorer is what percent of the number of people who like both Google and Firefox?

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In a group of internet users, 600 people like only Explorer. The number of people who like only Firefox is 4/5 times the number of people who like only Explorer. The number of people who like Google is 30% more than the number of people who like only Firefox. The number of people who like only Google is 50 more than half the number of people who like Google. The number of people who like both Google and Firefox but not Explorer is half the number of people who like only Google.The number of people who like both Firefox and Explorer but not Google is 360 less than the number of people who like Google. The number of people who like both Firefox and Explorer but not Google is 8 times the number of people who like all the three browsers

What is the difference between the number of people who like only Google and the number of people who like only Firefox?

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In a group of internet users, 600 people like only Explorer. The number of people who like only Firefox is 4/5 times the number of people who like only Explorer. The number of people who like Google is 30% more than the number of people who like only Firefox. The number of people who like only Google is 50 more than half the number of people who like Google. The number of people who like both Google and Firefox but not Explorer is half the number of people who like only Google.The number of people who like both Firefox and Explorer but not Google is 360 less than the number of people who like Google. The number of people who like both Firefox and Explorer but not Google is 8 times the number of people who like all the three browsers

What is the total number of people who like at least one of the three browsers?

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A market research firm conducted a survey in a society to understand the consumption of bottled cold drink. It is found that among all the people who live in the society, 3780 like only Fanta. The number of people who like only Limca is 6/7 of the number of people who like only Fanta. The number of people who like only Pepsi is 30 percent more than the number of people who like only Limca. The number of people who like both Fanta and Limca but not Pepsi is 1/12 of the total number of people who like exactly one cold drink. The number of people who like all the three cold drinks is 25% less than the number of people who like both Fanta and Limca but not Pepsi. The number of people who like exactly two cold drinks is four times the number of people who like all the three cold drinks. The ratio of the number of people who like both Pepsi and Limca but not Fanta to the number of people who like Fanta and Pepsi but not Limca is 1:2.

How many people in the society like all the three cold drinks?

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A market research firm conducted a survey in a society to understand the consumption of bottled cold drink. It is found that among all the people who live in the society, 3780 like only Fanta. The number of people who like only Limca is 6/7 of the number of people who like only Fanta. The number of people who like only Pepsi is 30 percent more than the number of people who like only Limca. The number of people who like both Fanta and Limca but not Pepsi is 1/12 of the total number of people who like exactly one cold drink. The number of people who like all the three cold drinks is 25% less than the number of people who like both Fanta and Limca but not Pepsi. The number of people who like exactly two cold drinks is four times the number of people who like all the three cold drinks. The ratio of the number of people who like both Pepsi and Limca but not Fanta to the number of people who like Fanta and Pepsi but not Limca is 1:2.

What is the total number of people in the society who like at least one of the three cold drinks?

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A market research firm conducted a survey in a society to understand the consumption of bottled cold drink. It is found that among all the people who live in the society, 3780 like only Fanta. The number of people who like only Limca is 6/7 of the number of people who like only Fanta. The number of people who like only Pepsi is 30 percent more than the number of people who like only Limca. The number of people who like both Fanta and Limca but not Pepsi is 1/12 of the total number of people who like exactly one cold drink. The number of people who like all the three cold drinks is 25% less than the number of people who like both Fanta and Limca but not Pepsi. The number of people who like exactly two cold drinks is four times the number of people who like all the three cold drinks. The ratio of the number of people who like both Pepsi and Limca but not Fanta to the number of people who like Fanta and Pepsi but not Limca is 1:2.

The total number of people who like exactly one of the three cold drinks is what percentage of total number of people who like at least one of the three cold drinks?

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A market research firm conducted a survey in a society to understand the consumption of bottled cold drink. It is found that among all the people who live in the society, 3780 like only Fanta. The number of people who like only Limca is 6/7 of the number of people who like only Fanta. The number of people who like only Pepsi is 30 percent more than the number of people who like only Limca. The number of people who like both Fanta and Limca but not Pepsi is 1/12 of the total number of people who like exactly one cold drink. The number of people who like all the three cold drinks is 25% less than the number of people who like both Fanta and Limca but not Pepsi. The number of people who like exactly two cold drinks is four times the number of people who like all the three cold drinks. The ratio of the number of people who like both Pepsi and Limca but not Fanta to the number of people who like Fanta and Pepsi but not Limca is 1:2.

What is the difference between the number of people who like Fanta and the number of people who like Pepsi?

Study the following information carefully and answer the questions.
A market research firm conducted a survey in a society to understand the consumption of bottled cold drink. It is found that among all the people who live in the society, 3780 like only Fanta. The number of people who like only Limca is 6/7 of the number of people who like only Fanta. The number of people who like only Pepsi is 30 percent more than the number of people who like only Limca. The number of people who like both Fanta and Limca but not Pepsi is 1/12 of the total number of people who like exactly one cold drink. The number of people who like all the three cold drinks is 25% less than the number of people who like both Fanta and Limca but not Pepsi. The number of people who like exactly two cold drinks is four times the number of people who like all the three cold drinks. The ratio of the number of people who like both Pepsi and Limca but not Fanta to the number of people who like Fanta and Pepsi but not Limca is 1:2.

What is the total number of people who like both Limca and Fanta?