Uniplanar Algebra: Being Part I of a Prop©¡deutic to the Higher Mathematical AnalysisBerkeley Press, 1893 - 141ÆäÀÌÁö |
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... modulus 4I 25. Law of involution . 26. Law of metathesis . 27 .. The law of indices ❀❀❀ 42 43 43 28. The addition theorem . 44 29. Infinite values of a logarithm 45 30. Indeterminate exponential forms . 45 VIII . ARTICLE . SYNOPSIS ...
... modulus 4I 25. Law of involution . 26. Law of metathesis . 27 .. The law of indices ❀❀❀ 42 43 43 28. The addition theorem . 44 29. Infinite values of a logarithm 45 30. Indeterminate exponential forms . 45 VIII . ARTICLE . SYNOPSIS ...
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... modulus , base , exponential , logarithm 69. Exponential of o , I and logarithm of 1 , B. 78 Sr 70. Classification of logarithmic systems . SI 71. Special constructions 72. Correspondence of initial values of exponential and logarithm ...
... modulus , base , exponential , logarithm 69. Exponential of o , I and logarithm of 1 , B. 78 Sr 70. Classification of logarithmic systems . SI 71. Special constructions 72. Correspondence of initial values of exponential and logarithm ...
xii ÆäÀÌÁö
... modulus be changed from m to km the corre- sponding base is changed from b to b1 / k . 139 Art . 27 , pages 43 , 44. Alternative proof of the law of indices 139 The following quantitive and operational signs are used in this xii CONTENTS .
... modulus be changed from m to km the corre- sponding base is changed from b to b1 / k . 139 Art . 27 , pages 43 , 44. Alternative proof of the law of indices 139 The following quantitive and operational signs are used in this xii CONTENTS .
xiii ÆäÀÌÁö
... modulus K. Sine , cosine , etc. , to modulus K. Limit of , when approaches a . ... Therefore . UNIPLANAR ALGEBRA INTRODUCTION . EUCLID'S DOCTRINE OF PROPORTION . A. SIGNS AND ABBREVIATIONS .
... modulus K. Sine , cosine , etc. , to modulus K. Limit of , when approaches a . ... Therefore . UNIPLANAR ALGEBRA INTRODUCTION . EUCLID'S DOCTRINE OF PROPORTION . A. SIGNS AND ABBREVIATIONS .
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... modulus , base , logarithm are defined as follows : The speed of P obviously known By means of this exponential ... modulus of the system . ( ii ) . The modulus having been assigned , the value of x , corresponding to y = 0J1 , is ...
... modulus , base , logarithm are defined as follows : The speed of P obviously known By means of this exponential ... modulus of the system . ( ii ) . The modulus having been assigned , the value of x , corresponding to y = 0J1 , is ...
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a+ib addition and subtraction Addition Theorem affix Agenda amplitude angle AOQ arc AVQ arc-ratio assumed base CALIFORNIA circular sector co-ordinates commutative law complex quantities corresponding cosh COSK csch defined definition direction distance equal equation equilateral hyperbola expm exponential expressed factors formula functions geometric addition Goniometric Ratios Hence hyperbolic functions Hyperbolic Ratios hyperbolic sector imaginary indeterminate form integer inverse law of indices law of involution law of metathesis length logarithmic spiral logm metathesis modular normal modulus natural logarithms negative nth roots orthomorphosis parallel path plane polynomial positive Prop proportion PROPOSITION Prove the following quotient radius real axis real magnitudes real quantities reciprocal represent respectively roots sech sector sinh speed straight line tanh tensor tion triangle unit circle x+iy z-plane zero