radius of cylinder is 5 centimetre and its height is 40 centimetre find its curved surface area total surface area and volume of cylinder About the author Amara
Answer: curved surface area(CSA) = 1257.14285714 Total Surface Area(TSA) = 1414.28571428 volume of cylinder(V) = 3142.85714285 Step-by-step explanation: GIVEN: Height(h):40 Radius(r):5 We know that, curved surface area(CSA) = 2πrh CSA = (2×22×5×40)÷7 CSA = 8800÷7 CSA = 1257.14285714 We know that, Total Surface Area(TSA) = 2πr(h+r) TSA = (2×22×5(40+5))÷7 TSA = (220×45)÷7 TSA = 9900÷7 TSA = 1414.28571428 We know that, volume of cylinder(V) = πr²h V = (22×5×5×40)÷7 V = 22000÷7 V = 3142.85714285 Reply
Step-by-step explanation: CSA=2πrh =2×22/7×5×40 =22/7×5×20 =22/7×100 =3.14×100 =314 volume=πr^2h =22/7×25×40 =22/7×1000 =3.14×1000 =3140 Reply
Answer:
curved surface area(CSA) = 1257.14285714
Total Surface Area(TSA) = 1414.28571428
volume of cylinder(V) = 3142.85714285
Step-by-step explanation:
GIVEN:
Height(h):40
Radius(r):5
We know that,
curved surface area(CSA) = 2πrh
CSA = (2×22×5×40)÷7
CSA = 8800÷7
CSA = 1257.14285714
We know that,
Total Surface Area(TSA) = 2πr(h+r)
TSA = (2×22×5(40+5))÷7
TSA = (220×45)÷7
TSA = 9900÷7
TSA = 1414.28571428
We know that,
volume of cylinder(V) = πr²h
V = (22×5×5×40)÷7
V = 22000÷7
V = 3142.85714285
Step-by-step explanation:
CSA=2πrh
=2×22/7×5×40
=22/7×5×20
=22/7×100
=3.14×100
=314
volume=πr^2h
=22/7×25×40
=22/7×1000
=3.14×1000
=3140