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 466
Programmes and Problems K. A. Stroud. Regions enclosed by closed curves A region is said to be simply connected if a path joining A and B can be deformed to coincide with any other line joining A and B without going outside the region ...
Programmes and Problems K. A. Stroud. Regions enclosed by closed curves A region is said to be simply connected if a path joining A and B can be deformed to coincide with any other line joining A and B without going outside the region ...
Page 806
... region or of the external region . C 2 j OR B C ' 2 X U1 = 4 B ' A ' 4 U U1 0 4 U In the z - plane , the region is on the left - hand side as we proceed round the figure in the direction of the arrows ABCA . The region on the left- hand ...
... region or of the external region . C 2 j OR B C ' 2 X U1 = 4 B ' A ' 4 U U1 0 4 U In the z - plane , the region is on the left - hand side as we proceed round the figure in the direction of the arrows ABCA . The region on the left- hand ...
Page 828
... region on to which the region within the circle is mapped . 12. Obtain the image of the unit circle [ z ] = 1 in the z - plane under the transformation w = z + j3 z - j2 13. The circle [ z ] = 2 is mapped on to the w - plane by the ...
... region on to which the region within the circle is mapped . 12. Obtain the image of the unit circle [ z ] = 1 in the z - plane under the transformation w = z + j3 z - j2 13. The circle [ z ] = 2 is mapped on to the w - plane by the ...
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