Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body through different values of τ(τ=0.05,0.10,0.20,0.35,0.50,1,1.5)
for the radiation-conduction parameter (Nrc=0.25) and β=1, Bi=0.5, θa=0.5, and h=−0.2
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body through different values of τ(τ=0.05,0.10,0.20,0.35,0.50,1,1.5)
for the radiation-conduction parameter (Nrc=0.5) and β=1, Bi=0.5, θa=0.5, and h=−0.2
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body through different values of τ(τ=0.05,0.10,0.20,0.35,0.50,1) and
for (Bi=2), β=1, Nrc=0, θa=0, and h=−0.3
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body through different values of τ(τ=0.05,0.10,0.20,0.35,0.50,1) and
for (Bi=1), β=1, Nrc=0, θa=0, and h=−0.3
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body (η=1) for different values of the radiation-conduction
parameter Nrc(Nrc=0.25,0.5) and β=1, Bi=0.5, θa=0.5, and h=−0.2
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The variation in the temperature θ on the surface of the spherical body (η=1) for different values of the Biot number Bi(Bi=0.5,1,2)
and β=1, Nrc=0, θa=0, and h=−0.3
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The h-curve of θ″=∂2θ(η,ξ)/∂η2∣η=0 for ξ=0.5, β=0, Bi=1, Nrc=0, and θa=0
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
A comparison between the 30th order analytic homotopy solution (thin line) and the exact solution (solid line) at η=1, and for β=0,
Bi=1, Nrc=0, θa=0, and h=−0.3
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The 30th order analytic homotopy solution θ (as a function of τ) at η=1, and for β=0, Bi=1, Nrc=0, θa=0, and h=−0.3
Date of download: 7/28/2017
Copyright © ASME. All rights reserved.
From: Analytic Approximations for a Strongly Nonlinear Problem of Combined Convective and Radiative
Cooling of a Spherical Body
J. Heat Transfer. 2009;131(11):111703-111703-6. doi:10.1115/1.3154625
Figure Legend:
The h-curve of θ″=∂2θ(η,ξ)/∂η2∣η=0 for ξ=0.5, β=1, Bi=0.5, Nrc=0.5, and θa=0.5