Without using the Second Derivative Test, can the convexity of the natural exponential function be s

Adan Norton

Adan Norton

Answered question

2022-06-03

Without using the Second Derivative Test, can the convexity of the natural exponential function be shown directly from the definition of convexity? The expression
e t = n = 0 t n n !
can be used.

Answer & Explanation

Siffkiffanewsler6n

Siffkiffanewsler6n

Beginner2022-06-04Added 7 answers

Step 1
Demonstration in the case that x > 0 , y > 0 , and s , t Q +
Since s is a positive, proper, rational number, there are positive integers j < k such that s = j / k , and since s and t are a pair of conjugate numbers, t = ( k j ) / k . For any positive, real numbers z 1 , z 2 , z n , and for any positive integer n,
( z 1 + z 2 + + z k k ) n z 1 n + z 2 n + + z k n k . .
If z z 1 = z 2 = = z j = x and z j + 1 = z j + 2 = = z k = y ,
( s x + t y ) n = ( ( j k ) x + ( k j k ) y ) n = ( j x + ( k j ) y k ) n j x n + ( k j ) y n k = ( j k ) x n + ( k j k ) y n = s x n + t y n . .
Consequently,
( s x + t y ) n n ! s x n + t y n n ! . .

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