Advanced book on Mathematics Olympiad

3.2 Continuity, Derivatives, and Integrals 135

Solution.We prove that the function

f(t)=at+bt+ct

is increasing fort≥0. Its first derivative is

f′(t)=atlna+btlnb+ctlnc,

for which we can tell only thatf′( 0 )=lnabc=ln 1=0. However, the second
derivative isf′′(t)=atln^2 a+btln^2 b+ctln^2 c, which is clearly positive. We thus
deduce thatf′is increasing, and sof′(t)≥f′( 0 )=0 fort≥0. Therefore,fitself is
increasing fort≥0, and the conclusion follows. 

And now an exciting example found in D. Bu ̧sneag, I. Maftei,Themes for Mathematics
Circles and Contests(Scrisul Românesc, Craiova).

Example.Prove that
∣
∣∣
∣∣
∣
∣∣
∣

1 +a 1 1 ··· 1

11 +a 2 ··· 1

..

.

..

.

... ..

.

11 ··· 1 +an

∣

∣∣

∣∣

∣

∣∣

∣

=a 1 a 2 ···an

(

1 +

1

a 1

+

1

a 2

+···+

1

an

)

.

Solution.In general, if the entries of a matrix depend in a differentiable manner on a
parameterx,
⎛
⎜
⎜⎜
⎝

a 11 (x) a 12 (x)···a 1 n(x)

a 21 (x) a 22 (x)···a 2 n(x)

..

.

..

.

... ..

.

an 1 (x) an 2 (x)···ann(x)

⎞

⎟

⎟⎟

⎠

,

then the determinant is a differentiable function ofx, and its derivative is equal to
∣
∣∣
∣
∣∣
∣∣
∣

a′ 11 (x) a′ 12 (x)···a′ 1 n(x)

a 21 (x) a 22 (x)···a 2 n(x)

..

.

..

.

... ..

.

an 1 (x) an 2 (x)···ann(x)

∣

∣∣

∣

∣∣

∣∣

∣

+

∣

∣∣

∣

∣∣

∣∣

∣

a 11 (x) a 12 (x)···a 1 n(x)

a 21 ′(x) a′ 22 (x)···a 2 ′n(x)

..

.

..

.

... ..

.

an 1 (x) an 2 (x)···ann(x)

∣

∣∣

∣

∣∣

∣∣

∣

+···

+

∣∣

∣∣

∣∣

∣∣

∣

∣

a 11 (x) a 12 (x)···a 1 n(x)

a 21 (x) a 22 (x)···a 2 n(x)

..

.

..

.

... ..

.

an′ 1 (x) an′ 2 (x)

..

.a′nn(x)

∣∣

∣∣

∣∣

∣∣

∣

∣

.