Explanation Given: The wire has a density ρ ( x , y ) = x + y + 2 in the shape of the curve given by r ( t ) = cos t i + sin t j ; 0 ≤ t ≤ π . Formula used: For parameterization given by r ( t ) = x i + y j , the length of curve ds is given by, d s = ‖ r ′ ( t ) ‖ d t = [ x ′ ( t ) ] 2 + [ y ′ ( t ) ] 2 d t Calculation: For the curve r ( t ) = cos t i + sin t j , x ( t ) = cos t , and y ( t ) = sin t which implies that x ′ ( t ) = − sin t and y ′ ( t ) = cos t

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Chapter 15.2, Problem 25E

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To calculate: The total mass of a spring with density $ρ(x,y,z)=z$ if the wire has a density $ρ(x,y)=x+y+2$ in the shape of the curve given by $r(t)=costi+sintj$ ; $0≤t≤π$ .

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Chapter 15.2, Problem 24E

Chapter 15.2, Problem 26E

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The total mass of a spring with density ρ ( x , y , z ) = z if the wire has a density ρ ( x , y ) = x + y + 2 in the shape of the curve given by r ( t ) = cos t i + sin t j ; 0 ≤ t ≤ π .

Solution Summary: The author explains how to calculate the total mass of a spring with density rho (x,y,z)=z.

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To calculate: The total mass of a spring with density $ρ(x,y,z)=z$ if the wire has a density $ρ(x,y)=x+y+2$ in the shape of the curve given by $r(t)=costi+sintj$ ; $0≤t≤π$ .

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Chapter 15 Solutions