Question

How to solve without using derivative...just analytically.

lim h→0 (tan(pie/6) +h) – tan(7) h) / (h)​

Answer 1

Undefined

Step-by-step explanation:

We can't simplify the equation [ lim h→0 (tan(pi/6)+h)–tan(7)h)/(h)​ ] any further than how it is at the moment. When we graph this, we will see that h will go across the origin and read as "undefined".

Best of Luck!

Answer 2

undef

Step-by-step explanation:

Step 1: Write limit

`\lim_(h \to 0) ([tan((\pi)/(6) )+ h]-htan(7))/(h)`

We can't simplify the derivative farther, and if we do try to graph it, we see that when h approaches 0, we get undef.