Central Limit Theorem (CLT) | Statistical Inference | VTU Exam Problem | Part 3

🎓 In this video, we solve another important Central Limit Theorem (CLT) problem from VTU Mathematics-III (BCS301) – Module 4: Statistical Inference 2. Question: In a recent study reported on the Flurry Blog, the mean age of tablet users is 34 years. Suppose the standard deviation is 15 years. Take a sample of size n = 100. Using the Central Limit Theorem, find the probability that the sample mean age is more than 30 years. You’ll learn: ✅ Concept of Sampling Distribution of the Mean ✅ Application of Central Limit Theorem (CLT) ✅ Calculating Probability using Z-scores and Normal Distribution Table ✅ Step-by-step VTU exam-oriented explanation 🎯 VTU Focus: Subject Code: BCS301 – Mathematics-III Module 4: Statistical Inference 2 Topics: Sampling Variables, Central Limit Theorem, Confidence Limits Applicable for CS & Engineering (2023–24 onwards) 📚 Concepts Covered: Sampling Distribution of Sample Mean Normal Approximation using CLT Probability Calculation Above a Given Limit 💎 Support Us: Join our channel and get access to exclusive perks 👇 🔗    / @officialmathematicstutor   #CentralLimitTheorem #SamplingDistribution #VTUMathematics3 #BCS301 #StatisticalInference2 #ConfidenceLimits #VTU #EngineeringMathematics3 #VTUCS #VTU2023Syllabus #ProbabilityAndStatistics #VTUExamPreparation #Maths3VTU #VTUImportantQuestions