a)
An­ge­bot A:
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q = 1 + p\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 1{,}2\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}012\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 1{,}4\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}014\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 1{,}6\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}016\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_n = K_0 \cdot q_1 \cdot q_2 \cdot ... \cdot q_n$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_3 = 2\,500{,}00€ \cdot 1{,}012 \cdot 1{,}014 \cdot 1{,}016$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_3 \approx2\,606{,}47€$

Ant­wort: Bei An­ge­bot A er­hält man 2 606,47€ nach 3 Jah­ren und bei An­ge­bot B nur
2 602,62€.

a)
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q = 1 + p\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 1$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}01\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 2\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}02\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 3\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}03\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1 = 1 + 4\%$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} q_1= 1{,}04\%$

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_n = K_0 \cdot q_1 \cdot q_2 \cdot ... \cdot q_n$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_4 = 500{,}00€ \cdot 1{,}01 \cdot 1{,}02 \cdot 1{,}03 \ cdot 1{,}04$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_4 \approx 551{,}78€$

Ant­wort: Nach 4 Jah­ren be­trägt das Gut­ha­ben 551,78€

b)
500,00€ - 100%
1,00€ - 0,2%
551,78€ - 110,36%

110,36% - 100% = 10,36%

Ant­wort: Der Zu­wachs be­trägt 10,36%.

a)
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_n = K_0 \cdot q_1 \cdot q_2 \cdot q_3$ |$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} : q_1; q_2; q_3$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} K_n : q_1 : q_2 : q_3 = K_0$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 10\, 000{,}00€ : 1{,}026 : 1{,}031 : 1{,}038 = K_0$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 9\,107{,}45 \approx K_0$

Ant­wort: Man muss ca. 9 107,45€ an­le­gen.

b)
9 107,45€ - 100%
1,00€ - 0,01098002185 (nicht run­den!)
10 000,00€ - 109,80%

109,80% - 100% = 9,80%
9,80% : 3 = 3,2%

Ant­wort: Es wären ca. 3,2% not­wen­dig, um den­sel­ben Zu­wachs zu er­rei­chen.