MTH 1001 Lecture : Introduction To Differentiation Of Natural Logarithmic Functions
58 views7 pages
Document Summary
Ex ponential and logarithmie tndians as ekpnenliel tye ot transtendental fanctlons. Gnph of l0g srith expln sth on he graphh sfylnf cn b fhe anti-jrintiu yhes a ofthe ittertlal espst o. Rrgkti ha, bn, sine 70 pliny ts pssitiv. Stan dard losarthne rales t n , 1 = 0: n a ) tn a + ln b, un, n ( ln, Note; hie temone your dankin kewten os gla)= 2 n i,70. Tho deritive of natual laga: ithanic funcion ena n "34-]- dx. 5(n) paerntt f= ni. : n, (3n 1), fewralten. Loqariht can be used to dittenatate nonls findion. Cyiv inge y-aa)t f>o, so ln it) will be detincs. Rewt n ra)= 2 un{7-2)=~bn{ (+1) iferentnate poth gidos of he 5tpatran. In u- ,ua au), u"= p"o) la) as if the. We can difereint n ab sdte vliue is not phesefo t. C taj= unlsin , s i "n x.