How Long to Read Higher-Order Differential Equations and Elasticity

How Long Does it Take to Read Higher-Order Differential Equations and Elasticity?

It takes the average reader 6 hours and 40 minutes to read Higher-Order Differential Equations and Elasticity by Luis Manuel Braga da Costa Campos

Assuming a reading speed of 250 words per minute. Learn more

Description

Higher-Order Differential Equations and Elasticity is the third book within Ordinary Differential Equations with Applications to Trajectories and Vibrations, Six-volume Set. As a set, they are the fourth volume in the series Mathematics and Physics Applied to Science and Technology. This third book consists of two chapters (chapters 5 and 6 of the set). The first chapter in this book concerns non-linear differential equations of the second and higher orders. It also considers special differential equations with solutions like envelopes not included in the general integral. The methods presented include special differential equations, whose solutions include the general integral and special integrals not included in the general integral for myriad constants of integration. The methods presented include dual variables and differentials, related by Legendre transforms, that have application in thermodynamics. The second chapter concerns deformations of one (two) dimensional elastic bodies that are specified by differential equations of: (i) the second-order for non-stiff bodies like elastic strings (membranes); (ii) fourth-order for stiff bodies like bars and beams (plates). The differential equations are linear for small deformations and gradients and non-linear otherwise. The deformations for beams include bending by transverse loads and buckling by axial loads. Buckling and bending couple non-linearly for plates. The deformations depend on material properties, for example isotropic or anisotropic elastic plates, with intermediate cases such as orthotropic or pseudo-isotropic. Discusses differential equations having special integrals not contained in the general integral, like the envelope of a family of integral curves Presents differential equations of the second and higher order, including non-linear and with variable coefficients Compares relation of differentials with the principles of thermodynamics Describes deformations of non-stiff elastic bodies like strings and membranes and buckling of stiff elastic bodies like bars, beams, and plates Presents linear and non-linear waves in elastic strings, membranes, bars, beams, and plates

How long is Higher-Order Differential Equations and Elasticity?

Higher-Order Differential Equations and Elasticity by Luis Manuel Braga da Costa Campos is 394 pages long, and a total of 100,076 words.

This makes it 133% the length of the average book. It also has 122% more words than the average book.

How Long Does it Take to Read Higher-Order Differential Equations and Elasticity Aloud?

The average oral reading speed is 183 words per minute. This means it takes 9 hours and 6 minutes to read Higher-Order Differential Equations and Elasticity aloud.

What Reading Level is Higher-Order Differential Equations and Elasticity?

Higher-Order Differential Equations and Elasticity is suitable for students ages 12 and up.

Note that there may be other factors that effect this rating besides length that are not factored in on this page. This may include things like complex language or sensitive topics not suitable for students of certain ages.

When deciding what to show young students always use your best judgement and consult a professional.

Where Can I Buy Higher-Order Differential Equations and Elasticity?

Higher-Order Differential Equations and Elasticity by Luis Manuel Braga da Costa Campos is sold by several retailers and bookshops. However, Read Time works with Amazon to provide an easier way to purchase books.

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