Further Engineering Mathematics: Programmes and ProblemsThe purpose of this book is essentially to provide a sound second year course in mathematics appropriate to studies leading to BSc Engineering degrees. It is a companion volume to "Engineering Mathematics" which is for the first year. An ELBS edition is available. |
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Page 179
... denoted by K ( k ) E ( k , π / 2 ) is denoted by E ( k ) . Values of the functions F ( k , ø4 ) , E ( k , ø ) , K ( k ) and E ( k ) for various values of k and are available in published tables . The method , therefore , rests on making ...
... denoted by K ( k ) E ( k , π / 2 ) is denoted by E ( k ) . Values of the functions F ( k , ø4 ) , E ( k , ø ) , K ( k ) and E ( k ) for various values of k and are available in published tables . The method , therefore , rests on making ...
Page 375
... denoted by F ( t ) = H ( tc ) where H ( t - c ) is a single symbol in which the c indicates the value of t at which the function changes from a value 0 to a value 1 . Thus , the function 1 0 is denoted by F ( t ) = = t X F ( t ) = H ( t ...
... denoted by F ( t ) = H ( tc ) where H ( t - c ) is a single symbol in which the c indicates the value of t at which the function changes from a value 0 to a value 1 . Thus , the function 1 0 is denoted by F ( t ) = = t X F ( t ) = H ( t ...
Page 467
... denoted by f . Negative direction ( clockwise ) line in- tegral denoted by With a closed curve , the path c cannot be single - valued . Therefore , we divide the path into two or more parts and treat each separately as a single - valued ...
... denoted by f . Negative direction ( clockwise ) line in- tegral denoted by With a closed curve , the path c cannot be single - valued . Therefore , we divide the path into two or more parts and treat each separately as a single - valued ...
Contents
coefficients and roots | 33 |
Theory of Equations Part 2 | 43 |
Partial Differentiation | 91 |
Copyright | |
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a₁ b₁ b₂ c₁ c₂ coefficients cos² cosh cosine curl F curve curvilinear coordinates defined dx dy dx² dy dx Evaluate exact differential Example expression F.dr Fourier series frame function f(x function values gives grad graph Green's theorem harmonic i+ j+ inverse transforms k₁ k₂ Laplace transform line integral matrix method nx dx obtain odd function parametric equations partial fractions Pdx Qdy periodic function plane polar coordinates programme region Revision Summary roots scalar sin nx sin² sinh solution Solve the equation stationary values substitute surface Test Exercise theorem U₁ variables vector field w-plane x₁ xy-plane Y₁ zero δε δι δυ аф бу дг ду ди ду ду дх ду дхду Оф მა