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Grade upto college level Mechanics

Block B in Fig. weighs 712 N. The coefficient of static friction between block B and the table is 0.25. Find the maxi- mum weight of block A for which block B will remain at rest
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

Profile image of Amit Saxena
11 Years agoGrade upto college level
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1 Answer

Profile image of Navjyot Kalra
11 Years ago
232-966_1.PNG
Round off to three significant figures,
WA = 155 N
Therefore the weight of the block A for which the block B experiences maximum force and still manages to be at rest is 155 N.