Getal & Ruimte (12e editie) - havo wiskunde B

'Logaritmen herleiden'.

havo wiskunde B	9.3 Rekenregels voor logaritmen
Logaritmen herleiden (6)	opgave 1 Herleid tot één logaritme. 1p a \({}^{5}\!\log(4)+{}^{5}\!\log(2a+1)\) Optellen (1) 00ku - Logaritmen herleiden - basis - basis - 1ms - dynamic variables a \({}^{5}\!\log(4)+{}^{5}\!\log(2a+1)\) \(\text{ }={}^{5}\!\log(4⋅(2a+1))\) \(\text{ }={}^{5}\!\log(8a+4)\) 1p 1p b \({}^{5}\!\log(4)-{}^{5}\!\log(2x+3)\) Aftrekken 00kv - Logaritmen herleiden - basis - eind - 1ms - dynamic variables b \({}^{5}\!\log(4)-{}^{5}\!\log(2x+3)\) \(\text{ }={}^{5}\!\log({4 \over 2x+3})\) 1p 2p c \(3⋅{}^{4}\!\log(5a)\) Vermenigvuldigen 00kw - Logaritmen herleiden - basis - midden - 1ms - dynamic variables c \(3⋅{}^{4}\!\log(5a)\) \(\text{ }={}^{4}\!\log((5a)^3)\) 1p ○ \(\text{ }={}^{4}\!\log(125a^3)\) 1p 2p d \(2⋅{}^{5}\!\log(p)+{}^{5}\!\log(4p+3)\) OptellenVermenigvuldigen 00kx - Logaritmen herleiden - basis - eind - 1ms - dynamic variables d \(2⋅{}^{5}\!\log(p)+{}^{5}\!\log(4p+3)\) \(\text{ }={}^{5}\!\log(p^2)+{}^{5}\!\log(4p+3)\) 1p ○ \(\text{ }={}^{5}\!\log(p^2⋅(4p+3))\) \(\text{ }={}^{5}\!\log(4p^3+3p^2)\) 1p opgave 2 Herleid tot één logaritme. 2p a \(2+{}^{4}\!\log(3x+5)\) Grondtal (1) 00ky - Logaritmen herleiden - basis - midden - 1ms - dynamic variables a \(2+{}^{4}\!\log(3x+5)\) \(\text{ }={}^{4}\!\log(4^2)+{}^{4}\!\log(3x+5)\) \(\text{ }={}^{4}\!\log(16)+{}^{4}\!\log(3x+5)\) 1p ○ \(\text{ }={}^{4}\!\log(16⋅(3x+5))\) \(\text{ }={}^{4}\!\log(48x+80)\) 1p 3p b \({}^{5}\!\log(625)+{}^{3}\!\log(a+2)\) Grondtal (2) 00kz - Logaritmen herleiden - basis - eind - 1ms - dynamic variables b \({}^{5}\!\log(625)+{}^{3}\!\log(a+2)\) \(\text{ }={}^{5}\!\log(5^4)+{}^{3}\!\log(a+2)\) \(\text{ }=4+{}^{3}\!\log(a+2)\) 1p ○ \(\text{ }={}^{3}\!\log(3^4)+{}^{3}\!\log(a+2)\) \(\text{ }={}^{3}\!\log(81)+{}^{3}\!\log(a+2)\) 1p ○ \(\text{ }={}^{3}\!\log(81⋅(a+2))\) \(\text{ }={}^{3}\!\log(81a+162)\) 1p

havo wiskunde B

9.3 Rekenregels voor logaritmen

Logaritmen herleiden (6)

opgave 1

Herleid tot één logaritme.

\({}^{5}\!\log(4)+{}^{5}\!\log(2a+1)\)

Optellen (1)

00ku - Logaritmen herleiden - basis - basis - 1ms - dynamic variables

\({}^{5}\!\log(4)+{}^{5}\!\log(2a+1)\)
\(\text{ }={}^{5}\!\log(4⋅(2a+1))\)
\(\text{ }={}^{5}\!\log(8a+4)\)

\({}^{5}\!\log(4)-{}^{5}\!\log(2x+3)\)

Aftrekken

00kv - Logaritmen herleiden - basis - eind - 1ms - dynamic variables

\({}^{5}\!\log(4)-{}^{5}\!\log(2x+3)\)
\(\text{ }={}^{5}\!\log({4 \over 2x+3})\)

\(3⋅{}^{4}\!\log(5a)\)

Vermenigvuldigen

00kw - Logaritmen herleiden - basis - midden - 1ms - dynamic variables

\(3⋅{}^{4}\!\log(5a)\)
\(\text{ }={}^{4}\!\log((5a)^3)\)

○

\(\text{ }={}^{4}\!\log(125a^3)\)

\(2⋅{}^{5}\!\log(p)+{}^{5}\!\log(4p+3)\)

OptellenVermenigvuldigen

00kx - Logaritmen herleiden - basis - eind - 1ms - dynamic variables

\(2⋅{}^{5}\!\log(p)+{}^{5}\!\log(4p+3)\)
\(\text{ }={}^{5}\!\log(p^2)+{}^{5}\!\log(4p+3)\)

○

\(\text{ }={}^{5}\!\log(p^2⋅(4p+3))\)
\(\text{ }={}^{5}\!\log(4p^3+3p^2)\)

opgave 2

Herleid tot één logaritme.

\(2+{}^{4}\!\log(3x+5)\)

Grondtal (1)

00ky - Logaritmen herleiden - basis - midden - 1ms - dynamic variables

\(2+{}^{4}\!\log(3x+5)\)
\(\text{ }={}^{4}\!\log(4^2)+{}^{4}\!\log(3x+5)\)
\(\text{ }={}^{4}\!\log(16)+{}^{4}\!\log(3x+5)\)

○

\(\text{ }={}^{4}\!\log(16⋅(3x+5))\)
\(\text{ }={}^{4}\!\log(48x+80)\)

\({}^{5}\!\log(625)+{}^{3}\!\log(a+2)\)

Grondtal (2)

00kz - Logaritmen herleiden - basis - eind - 1ms - dynamic variables

\({}^{5}\!\log(625)+{}^{3}\!\log(a+2)\)
\(\text{ }={}^{5}\!\log(5^4)+{}^{3}\!\log(a+2)\)
\(\text{ }=4+{}^{3}\!\log(a+2)\)

○

\(\text{ }={}^{3}\!\log(3^4)+{}^{3}\!\log(a+2)\)
\(\text{ }={}^{3}\!\log(81)+{}^{3}\!\log(a+2)\)

○

\(\text{ }={}^{3}\!\log(81⋅(a+2))\)
\(\text{ }={}^{3}\!\log(81a+162)\)