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05 Dec 2025, 22:14
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E
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Difficulty:
95%
(hard)
Question Stats:
40% (01:47) correct
60%
(01:56)
wrong
based on 173
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In a group, 95% members speak English, 85% speak French, 80% speak German, and 90% speak Spanish. What is the minimum possible percentage of members in the group who speak all four languages?
A. 0
B. 10
C. 20
D. 40
E. 50
A. 0
B. 10
C. 20
D. 40
E. 50
06 Dec 2025, 12:28
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Assuming total - 100 members
summing percentages across 4 languages - 95 + 85 + 80 + 90 = 350 with overlap.
we need to minimize members who speak all 4 hence we distribute the language slots as evenly as possible, first ensuring everyone speaks 1, then 2, then 3 languages. Only the leftover slots must go to the 4th language.
single lang: distributing 1: to each -> 350-100 = 250
speaking 2 lang: distributing 1 more to each -> 250-100 = 150
speaking 3 lang: distributing 1 more to each -> 150-100 = 50
now each member will be speaking 3 languages
remaining 50 must add on to speak 4 languages, hence minimum possible is 50
summing percentages across 4 languages - 95 + 85 + 80 + 90 = 350 with overlap.
we need to minimize members who speak all 4 hence we distribute the language slots as evenly as possible, first ensuring everyone speaks 1, then 2, then 3 languages. Only the leftover slots must go to the 4th language.
single lang: distributing 1: to each -> 350-100 = 250
speaking 2 lang: distributing 1 more to each -> 250-100 = 150
speaking 3 lang: distributing 1 more to each -> 150-100 = 50
now each member will be speaking 3 languages
remaining 50 must add on to speak 4 languages, hence minimum possible is 50
07 Dec 2025, 04:09
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ExpertsGlobal5
Total number of people = 100
English speaking members = 95
French speaking members = 85
German speaking members = 80
Spanish speaking members = 90
Sum of the values = 95+85+80+90 = 350
we need to minimise the value of all 4 members :
Let’s do it my CHOCOLATE DISTRIBUTION METHOD
We have 350 chocolates and we need to distribute it to 4 sets I, II, III, IV, where each represent the students who study one language , 2 languages, 3 languages and ALL 4 languages respectively.
Since the max we can allocate to a set is 100 (Which is the total members= 100%)
To minimize IV , means we need to maximise (I,II, and III).
Lets first give each student 1 chocolate = I = 100
Remaining = 350-100 = 250
Let’s give each student 1 more chocolate, so the number of students who receive two chocolates (II) is 100.
Remaining chocolates = 250-100 = 150
since, all students have received the max capacity of 2 chocolates each, and we are still left with 150 chocolates.
Let’s give each of the 100 students, again 1 chocolate each (III)
so, Remaining chocolates = 150 - 100 = 50
After distributing, each student with each 3 chocolates, we are finally left with 50 chocolates.
Since it’s a 4 set problem, already three sets ( I, II, III) are filled.
NOW, the students can receive one more chocolate. There will be 50 such students who have received 4 chocolates.
Remaining 50 students will have each 3 chocolates.
Option E (50)
