WebClick here👆to get an answer to your question ️ There are 100 students in a class. In an examination, 50 of them failed in Mathematics, 45 failed in Physics, 40 failed in Biology and 32 failed in exactly two of the three subjects. Only one student passed in all the subjects. Then, the number of students failing in all the three subjects is WebAnswer (1 of 4): No U will have to write that specific subject again until u passs fully Otherwise u will get scorecard but not written as passed If u clear it with all subj U will get scorecard as passed
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WebJan 10, 2024 · There are $100$ students. $15$ students are not taking math, $20$ are not taking physics, $25$ are not taking chemistry, and $30$ are not taking biology. What is the maximum number of students not taking at least one subject? Obviously, the answer here is $15+20+25+30=90$. So, your answer to your question is correct as well. WebNov 18, 2024 · Picture this: you attend a drama club on a weekly basis, and have a huge passion for drama and the theater. You come alive when you’re on stage and love the buzz of performing. But, as your parents and teachers point out, you’re really good at science subjects. If you really apply yourself you could even become a doctor, a vet, a scientist. hillman 881294
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WebJan 30, 2024 · Research from the Education Policy Institute has shown a decline in the proportion of pupils taking at least one arts subject at GCSE level. In 2016 it reached 53.5%, the lowest level for a decade WebNationally Recognized Education Resource Website. We help find the right School, College, Camp, Library, Museum, Program, Business in your community. WebProbability : In a class of 125 students 70 passed in Mathematics , 55 in Statistics and 30 in both. Then find the probability that a student selected at random from the class has passed in only one subject . My approach : Let n(M) = 70 ( students passed in mathematics) ; n(S) = 55 ( students passed in Statistics) ; n(M $\cap S) = 30.$ hillman 883419