¹ÌºÐ°ú ÀûºÐÀÇ °ü°è¿¡ ´ëÇÑ ¿µ¾îÀÚ·á theoremµé°ú definitionµéÀ» Á¤¸®Çؼ º¸±â ÁÁÀ½. ½ÃÇè Àü¿¡ Á¤¸®Çϱâ À§ÇÑ ÀÚ·á·Î ÁÁÀ½. / 5. The Relation between Integration and Differentiation. Theorem 5.1. First Fundamental Theorem of Calculus. Theorem 5.2. Zero-Derivative Theorem. Theorem 5.3. Second Fundamental Theorem of Calculus. / 5. The Relation between Integra¡¦
¡¥ have (Tnf)` = Tn-1(f`). (c) Integration property. An indefinite integral of a Taylor polynomial of f is a Taylor polynomial of an indefinite integral of f. More precisely, if g(x) = , then we have Tn+1g(x) = . Theorem. 7.3. Substitution Property. Let g(x) = f(cx), where c is a constant. Then we have Tng(x;a) = Tnf(cx;ca). Theorem. 7.4. Let Pn be a
ÀÚ¿¬·Î±×¿Í Áö¼öÇÔ¼ö, ¿ªÇÔ¼ö, »ï°¢ÇÔ¼ö¿¡ ´ëÇÑ ¹ÌÀûºÐ¿¡ ´ëÇÑ theorem°ú definitionÀ» Á¤¸®ÇØ ³õÀº ¿µ¾îÀÚ·á ½ÃÇè Àü¿¡ Á¤¸®Çؼ º¸±â ÁÁÀº ÀÚ·áÀÓ. / ¸ñÂ÷ ¾øÀ½ / 6. The Logarithm, the Exponential, and the Inverse Trigonometric Functions. Definition. If x is a positive real number, we define the natural logarithm of x, denoted temporarily by L(x), to be the integ¡¦