[size=150]Beschrijf de relatie tussen de logaritmische functie met grondtal a en de exponentiële functie met grondtal a. [/size]

[size=200]Gevolg 1:[/size][br][br]log[sub]a[/sub]a= ... ?

Leg uit waarom.

[size=200]Gevolg 2:[/size][br][br]log[sub]a[/sub]1= ... ?

Leg uit waarom.

[size=200]Gevolg 3:[/size][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAt8AAAA3CAYAAADUgiYCAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAABfaVRYdFNuaXBNZXRhZGF0YQAAAAAAeyJjbGlwUG9pbnRzIjpbeyJ4IjowLCJ5IjowfSx7IngiOjczNSwieSI6MH0seyJ4Ijo3MzUsInkiOjU1fSx7IngiOjAsInkiOjU1fV19EViCOwAAF6xJREFUeF7tndvPXsMXx7ffvUNxiQhuBCFoNa02cUGFRAhNHRJpUiklkVCUIi4cok1o4oISEhFRpE0TcWhdVKK4KBWCuNBXRLir8x/Q3/PZ715v1zOd2YfnsJ/T95OsPPPs4xzWrFl79p6Z4450yIQQQgghhBBD53/FrxBCCCGEEGLIyPkWQgghhBCiJeR8CyGEEEII0RJyvoUQQgghhGgJOd9CCCGEEEK0hJxvIYQQQgghWkLOtxBCCCGmhquvvjo77rjjFoT/QowTcr6FEEIIMTXs2bMn2759e/FPiPFDzrcQQgghpoo777yzCAkxfsj5FkIIIYQQoiXkfAshhBBCCNEScr6FEKLDt99+uzBQ65xzzsn/h2zdurVrINfLL79c7BFCTCpvv/12dJAm28v4+eefs7vvvju3F/7cmAyTRx99NDv55JPz+2CjQthm+6vSJNph5pzvzz77rKtCmAghZhcc7SuuuCLbu3dv/n9ubi678cYb87DnoYceyjZv3lz8y7LTTz+9CAkhJo0//vgjW7x4cXbLLbdkZ511Vl7vjxw5ku3fvz87cOBAvh3nOgY249JLL82d2aeeeio/7/Dhw9mGDRuKI9oBx/qZZ57J/vrrr/z/pk2b8ocCA8ecbbb/3HPPzX/FiOkozMzRqSBHOhXkCMk3EULMLp1GNLcJsGbNmgW70GmE822eHTt25PvOPvvsYouYZCj7aSxP0+NFixYVW2YPq8erVq0qtnRjeRTbT92387ds2VJsPQr6UrXPbMqw+Oabb/L7fPDBB7lfQ1n7OJmt2r59e37MLOtCHchD8gy9sLxEKE/KMtYe9MpYeZ0kbJCJK6PzhLuQsYgQYnbB4GJ4wRo0JNawbt68Od/HOWLysbJGpgkcymlMVxMs/VXONY5pDHswC51Wf27MZzEbgQwTbJaPu90X5xE7Rrxlp+pBftlDU5nghFtb0Q+NPzvhG0f7VCP2TWSKm2++OT+H745i8GpnxYoVuaRe8wwSXjEJIQRgn0455ZQ8fOGFF2YdI5yHv/766/zX88477+T7OUcIMZl89NFHRSjLLrvssiLUzerVq/NfPtngk9W6nHjiiUVouGCzrrnmmuJfli1fvjz//eqrr7I77rgj/wRGdqoefHLIZ0fA50R8Xrhly5b819oDeOmll7LHH3+8+Nc7jZ3vf/75pwhl2X///VeEqvn777/zX/vuKMR/o+TDQgjRNhhfMGNs8H0n2/jGUwgxuRw8eLAIzTuxMc4///wilGU//PBDEarG+0ltYg8R2CjS9PTTT+f/RTU8MGH39+/fn3355Zd53jHGh99Dhw51LdqEA97kYSzG2Ay4vOGGG4pQd9hT1XsuhBCD4OKLL85/6UHyPPbYY+r1Fo3gDbG9LZ622XF6fRM+KZxwwglFqNuhZtDiokWL8rDvQTc+/vjj/HfNmjX5b1vgcFsvbcqPEnFYlAmn+/LLLy+2dMN+3iQYb731VhHqjbFxvknYkflv0JMrU1X1ngshjoUR/Uyb1WvjyGdgszY91bJly4rQvPME1uv9+uuv5/+FqIN/QzyqHtFh0eub8EnkjDPOKELzTu6LL76Yh5lpxB6qsLXYSx7acc7Zl4JjmanEpimkU5FzbVpA9jfFbBRM48PQqLn11luLUP9faMzcVINCzBIYYBxvps067bTTiq3NYcqtWXLA/XRcOBU0hPR605OV6hkRQkwOftxXypH64osvitCxU/Tx9mvVqlW5k33XXXflDvSpp56a957yrfBPP/2UHFuGXeYTkWeffTZ74YUX8k5HHHZ6zJkWEOc79SlMCj6DwE5b76z1vovBMchpGuV814TGF+cjnIifOUKZR7PuUxDHcTzn+euUyajgad6eylOLjoA/bppex5Ne+9QJodxShHqBjHrsAvFn7mp6Qj755JPGxtygh4dGZpwdcOtF8vWKBoxyQT+JNzpadzC3f33Lt57PP/989ueff5b2ZE0Ls17vxfiAQ4luUZetXlPHqccffvhh/su+lI6WsXLlyiKU5Z0TMWzANbaAgdge7s23wDjZ9tYewfnmW+GUvcVWMRgSu/zee+8tDJjEUac+gY05qQvpv+6663Kn/4EHHsi3cX1rg8x/Ef0x0DdXHWVpBFNvcRrSZFrAqmmPmC7H9vupcQjb9jKJTQlWhT+/DD8FDb/EibTza9uRqjhwPFP/cCz5kboOx7DfZBQwnY7Fx4Q4hvgplRDOmwYoF58uE8oqRZgXHeNX7Gkfm2YKIdwvTK1k0271UteGic1fa3GzfOfX4mxCGdXFbJZdo6zsp4U26r3ZOsqsqo6w38qW6dNioN/cPyxryo94Vt3Dn5MC/WeuZNOJMrH88ja9THoFfSRP7DrkE/lg6fVxTUG67Do+vlyLbbEp+Li+HVcm/bRdxMvSRrn6eFAO4b1SU7/Z/lhcOMfSzD1CfDrDfEDn2M75VfoVYj5UrM5YmdWxsZyPmK33abR02T34jaVRNIO6Qr6myq8JjWu+KQ4ySOfbX9crXqyixaSOsob481OYYnMMyhtWcv57o098Y3hnLmUI7D5Ik7wdNKZg5mz4svOOnFdEk17KAVLObj8Sy+c6YEytIaNcvG6mHADwaSg7btgQD69Lw5B+Dc+g8Dpo+uqxRtIk5kykqFvuveLr1aCkH7vRVr1Hd+y8lL00vP2PHRs+BKQkphuGPy4Gafc2vkqoe1C3DvaCOaYpIb2+/GL4h9YyCet6WKdS0qv99W1qrM0Fn36OiUH67BicUa/DBtssD7imOdLUI4tD7IG9zgMI1yXvQufc7herq+Y016nHXifDfArrBfeMpb8O5CP1u6nEym2S8XqJNGlLYjSu+WSq3byJoa8yBP66hA0SzH18ZUBsm0kvBW3XQlL4eKeecL0xQsljcfHGIlVovsKM0rmhkfMGxxsxKxtvtDD0Zowoi17gPLvHoKRX409c/LmUp79uCu+U9JoP/RJzjIYlo3bAfb3zNiPExzlVh2OY3tMg9mJfqvC2ZVDSj961Ve/9dbHpZXibH5add+LtWsQTYZ85MibEN4Y/JoaPA3ac+JNe8svfg3uy3Zwcfu248BgTO7YJoWNFnEgz2318rJyQGLafX+Jl6ULCe4R5Z8f5MiCdth1pUtc81lYSr1S9I712X+IQ4vd7IV4h3IP0+nLm3sQjdrzhy7VMvP3gerY9xLczdbDyI55hPvHf0sP9e9EzI6xHdaUs7yYN6obXj159C0+9UnZ4pW6Sub6hieGvSzhG1TWaYtdKXc9XFDK+DF8wVMoQqyhIKt/8/QZRuIPCGwUqOlh6Uw3atOHLN1V+1mBhrEaBd7xjDdKg8M7TMO9ThTUKZfntdbdpuVDm1Nt+Gq5JZpj13jfoKSeNfLdjQnvodZ0yitVJ4u+dQ45jW4jtR0K8rlseeLie2XZ+Y3i7nmrb6uLzBImVQ8zxjEEZYLNieQLeuYylHXr1B1L4ci3TMf9w0K8u9gJppbyRmP6GuocegeVprH23tFPHxgnK3tLRRCbdboYPoCaUT6rONEEDLkvw83faSlcp/P7du3cXoaNM8vSIDBzpKFwe7hiafOAhI7M7xmJmBlpdddVVRSjLfvvttyLUDSsfwigWYGHwGwMigbKyabCGAQOEOo1uHmaxAQZAMaCnTRg8hC7Cgw8+mP/G+PHHH4tQdxlWwWAqdJyBquFAq1lhmPW+06AXoSzbuXNnEerm3XffLUJZtnbt2iI0DzPPGG+++WZ0BhriTz2wNGCDU/dK8fnnnxeh+SnlQrhHx8nKw1y/l4F/TaCeG9TBWDkw2I8yqoLBgiwgkhoY6Kf8bWvmDCvXjlNbqmN+gZwlS5YUofZAHylv9Cs2o4npnvH999/nv2UD9izt2NNxAlvb8RUby6TbTa9j0HlgyusVA2pTdaYJcr5L8Jnv5/iM4VfCio2cpuCMf//9twh14526cVv+3gwCjS+NUOepcGYcb7jggguKUJZ99913RegoNLo4KGePaAEWproy7CFgmNDAk1ZAJ7yT2wbPPfdcEcqym266qQgdi1+VLtUY4NCcXMyrSzmi6zxUYGhn1fE2hlXv161bV4Sy7JVXXilC3Zge44hdeeWVeRisrgE66JfXjrFx48YilOUPU03wbUDKJvulxIc917V3gsv0njLybU6v2DXa6Dxi9hIrV3ugSWFtLLoxirbS4ll3+lbzD1LLzvNgaw+JZnPa7tAQaXiY2LNnz0DbdjnfJXgnuqqS+ZWwYobK99y88cYbRagbv3iHn8x9HPDTMtFrNWvL1vr5PcMnYrAeqVEtO77dLX3rexWHBdP6WQNEozHI+U+rYPosnEHg3mW9EL4ncunSpUWoG46hzjJH70UXXZSna//+/TP1cJliWPUeh8n3qvtyAu9gUw6+jH///fciVO9thtdNu2ZdvGOXmjrU92Yef/zxRWg4WPyH4XTi7DG1n5c2HcD333+/CGXZ8uXLi9CxUA7WxjZ5mzVIrOMh9RYUyD/wD4j2ELl3795cx8lf3rLRuWOr6uKgk0amSeWBREwncr5LGOTTPg2IOUX06FDhzJjzy38qJNDjNm4LefgGzAzPLOF7QHld68GA8moOZ2JUDhuviO1VM45p2Zzk/UKjwkIQQA/VoF7D1cU/FFc1vtZTiLOS6sW2eohekx7m7dVCOvMMs94z17HxrvvEBPz/sCPCXuHDmWeeWYTS+HK3h7a6+IeP1157rQgdhbrPWxIo07FBM6hPLaztYX5pHj5XrFjRJU3zqx98rz4L0KTw9Z91DEYBC+MAeYftNxsChNnGvNvUmV27dhV75h/msNPoCg/699xzT267aTd4y8DxfD7IG6Zt27ZVvtURE8yRhvgBFh0lKrZW01G2hfNi+OsSjtFRztJrNMWulbqe3181mMQPqkFSdBy0ruO8dJzzgQxaGQZ+8AjlMIuk9M90dxzKjjppcRy2oBOjoI6tgKrBcqKaYdZ7Bi3ZtTtOR7F1Hv7HtkPd8vfY8UhI2T7wNhs9Qq+o6wyes3giqbj4tqFufFPYdeqURVV72dRWxPBl0a/9q7qX4ctjlIP65ubm8kF5Pp9N2IZ+DGJg3qhB58P01ZFJH3BZVX/6pa+e719//bUIVWO9yDzxTQr2WhT8t6NV8PQag6dkXht2lDL/7RirBemURf60PI49bsSL3h1Ll/XQDxJ6U20Fs0EJr+0GySWXXFKEjr5SpOeLJYJ5qzEOZUcPCvo07HpGD/EwB3WWsW/fviKUZcuWLStCx2K9U2CvdMeJ2Kqo/Yrp5SAYdr3nbQn1BrCH9ordf/tr+z3+u9lffvmlCKXxn7R0GtQiVA96MS0uwFvLa6+9Nu8VZpyF7aM+MA6iLfotC9JlA7SB+Fs75KVpfvWK19uye3Kc741v601DDHqx+QyLb4HDfGMbPdptvhEcFr0Oth32+Idhc9JJJ+W/3g8cJI2dbz+wMDVQJgQjbozqG61e8E501YOGd85jhcU3wTRkDz/8cG4wqLg4aya9Yq8NGTBG48svDhgNGI17vw4oZYeRphFcv359sbXbWM4KftClDZpl2XEYp2XH0ScGluGAIzzshY1DUzl8+PCCXm/ZsmVkjndd0H/voJQ56eJY2qr3t99+exE6+s2v//bXD8w0zjvvvCKU5Z88VeEHAzf9TprX/3Qc0RbwuYB/GKBu8R+nta364B+q/acOTfGf0Fh9HofOgyruu+++ItT8QUr0BrMJoSNNpc1xQMMAG0jbV8fG9ETn4o3pGICF7nherZTBaxf/mij1qUqnsBaOIRzDvwYYxCsNuxYSw7+WIw1ldIzwwrGxNFoe8DvX4+IDIRY/rtlpAPJt5LePSz+fBpDHlDXCdbmHXTdVRtMM+eHTb//HNS98+fVbX0ynUvW3TbwdiMWH+kWaOw7TwnHT8Pq3Ldqu99yHa/Pr/5fZXDsGMduXwuuBzbfssX1IiG3vJ90+/6hH/eBte1mcfNuFhPg6VJZ/1m7FrgHEwfZX+QJl+DyivGLwiYcvS/4LMan05Hz7CoekKh2NoK/kZcbUXzNlVPz3h2WGpy52LSQGDU8dI0867ZiU4fBGo0y4Hwa2qkHxjnfoWPhvXZs4S5YO+6bR0m5x4T52XV+WVs78TjuWfnSRPCjT6XEAR4o4Upa9OqBW78bB8QZvK8IGmDSSXuLs7YXBfnS134eRaWLU9d6Xkw+X6RvlbscR31h5Em9/vVRdtf1IiOUF5/aqM5a/SD/1ELxTnUq3zxuTEH9MrP0O8y52DfDxQRf6wd8rzCPuQ3p92+Z9APYTXzG5UE/MT4rpEmVv9THm/1m7wDFV/lMdiINdr18bFyNeo2qAMSJiJmQayk8GIP4JHUkZCsMyDollLPiKjtj9yKTUOSl8g4KkDKK/J2mOHefTmkqjT19d4d4xvDGP3c8bqCZK488zCQ2zL3fuzfXZhswCod6X6fS4gM5SR3qNK/UspYujgHRY/ntDy6/poqXZl5PpapUtmjVGXe99eXpJ2WRgX9ihYe0Ags5SzravrMz9NULCNscL1+SeCM5sWYPv40qYOHIO12iKLwvE2kGu5+/jjwshrrYPsfgjlH2Yt0gM3xYhVgbEiXATfDvK+ZQxwvXYRln4eHM8EF87R0wuVo4mYX1Fn2xfTLf8uehMvwz6eiE9O99UCv/0XCYYgarGzioYUpbQ0PDUOScGFdWfX1ZxvQHGKJkR4NfigxGlESsjvGeVcM1YA2RGyoxPiOUlcW2CLwMklidhBUFS8ZxGfBk21TkxOLwh9kJ9NF0M9dn2V9miWWMc6n3o7KVsm8ceAPx5MeHaZWXuj42R0rWYpNqR2AOOSVPI87J0W1vkyzVGVXvEPXwbnyLlBzR1vsMHAi+0tUDaSV+4X7Z48pHz3RAyiMoXGgMMHpW7yiE1vHGyihaDysd1vbGmIJo0qLHKi7A9BYY+lk7ujdJUNULmwHN+6li2hwoY5p/vaUjlrSlpqiFIYcaYfChTNm9sOacq7dOENWiUoxgd6Bx6aHWZ8gjtBsdYXTCdniVdrcs41HuzjxYPHLG6cC7OuumCXYNtZW2JYTY91llheYMQJl5eyC+vhwg2PAb22vQR4X6c2wvkPff27RHX8zpubQlxS0GcwrwjjpZvda4BYVxi9bEO5Kldh3uS57R5Hq5r8SWunCMmH8rZ/DrKNQRdtXKP2SmzTxwzCJ3wbUeog4Ogb+dbVIPSUIhIHaXwjVyoZBge2xdr/Nhm+3sxfqIcGoZhVUYhxPjg7TZOYBnYdTs25jgIIYRHK1y2wBNPPJH/dp7qak3n5JfW9XPagp/yMDaH6M6dO4tQ9+p0on9YNZI5Zpl6adBLOwshxgu/kma4ymaIbK0QoglyvlvAFgVgCd862BzSsHTp0iJUDQu+PPLII3l40aL2ljqeBZjzk7m8N2/erCV/hZgxqhZZs/n+wS/GJYQQMeR8t8ClxeIkdVcl+/TTT/NfzqvrQON4+wV1lixZUoRmc0GcQcKCLSw4smHDhnxFMyHE9OMXZmI1SxYzY7E07KkJ/7G7tsgWnR73339/HhZCiBRyvltg48aNRWh+ifky6GFlJUyM+KuvvlpsPYr/DAXDDzQC5njjIALOOHAMSyHLAa8PK4XyiQl5SP6xnDQPQk8++WRxhBBi2uETwe3btxf/stwu44RjT034b50q2AhWlp2GJcWFEMPlOD78LsJiiODMWe8IRnr16tVdPSu81ty9e3duyPk2fNeuXdFeb5YU5nyWPPawbc+ePfk33zQInh07duRLzotq6OXG2fbwQIPjrUZViNkDm8ty7AcPHswOHDjQZXuxu4sXL85WrlwpGyuEqI2c7xbBiOMc79u3Lzt06FA2NzdX7JkfjIkhv/766yuNOL3Ya9euzc/nvPXr12fr1q3LnUN6a2+77bbcied627ZtqzXIU8yzdevWbNOmTXl41apV2b333qtvvIUQQggxMOR8CyGEEEII0RL65lsIIYQQQoiWkPMthBBCCCFES8j5FkIIIYQQoiXkfAshhBBCCNEScr6FEEIIIYRoCTnfQgghhBBCtIScbyGEEEIIIVpCzrcQQgghhBAtIedbCCGEEEKIVsiy/wOlyxIPwPC/NgAAAABJRU5ErkJggg==[/img][br][br]

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[/img]