MTH 1001 Lecture : Introduction To Differentiation Of Natural Logarithmic Functions

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.