[img]data:image/png;base64,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[/img]

Mit welchem Wocheneinkaufspreis hat der Händler zu rechnen, wenn er von seinem Lieferanten als Preismitteilung  (2,60   1,80   1,20   1,00) erhält?

2,60·500 + 1,80·600 + 1,20·800 + 1,00·400 = 3740,00

[img]data:image/png;base64,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[/img]

[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPkAAAB3CAIAAABOl3FvAAAK/klEQVR4nO2du3UrNxCG1YBruKlrYAuKXIESHzbAWIFjJwrFFpzyHEZKbgGqQOcwZBvjYF/YBQaLAWZmsdj5DwNbl/safMR7/n0Bk+kYetn6BkwmJRnrpqPIWPf0uJ1+vX88tr6NRGnebZ2RSb4rY32m++Xt5fX2s/VtEPX8eH17uXyLXqPuyCRFwFgf9fx4fTtdn6F/+j7/enuZfT7vhVd73E5JJ1xcGr3uz/VdDHcsMn5Y3A9W16Y+EfXLqxEw1nvdL2HQ7xe0OJEfxqqCiIRK8euTdF0h3LHI5LBOeiLi48NaBIx1gC5GSAPdsz771+fHa7zqwjVV52vHjt90Cm/44WHHPj9e385fxFuKKhKZgfXkIJCeKOfxIR4BYx0Avs94+O6XYLvZV2nEqn34kSR0fEO/MefvWO31uJ3K+1eTYpGhsk56oszHh1gEjPVIG71y1ErQffWNcgoc/W8pUEX1J0GBvl/YxqlrkSGxTnqi/McHPAKHZz23IqSzPlTqKYf0LXgIo8g/TV/gqNrXz0NhnfREJY+P3/nRWc8dz/XgUhoEvK7yFau91s+T11ItlBAZCuukJyp7fEAicHDWcwdzhN5I4JDl3I7ffU8o7BjNX5/Fc+EpkQnPw4SPIj1R4eNDOALHZj2zuR/KOKezjn5cRH6u73hhpzQp3+fCbkxSZCJzjstjSU9U/PgQjMCxWc+p/8YJRyJMI+uLK4ZmIYsLu3jyMbdlmJqseUWgznogAodmPaOznjDFi0i3ES/sspcsSw2kzkOk3IcJReDQrFOByAcdVibLlrM6xYOzwjXUop/K0FLN7lB3bAqhCByZdVpDXwQ6jASksV446QaFw9PCLlAIR805x05eBI7MenxR0FVuH315OaxC8qfeixZTAAAet1M+6+mRQS4dwFFvLWm6DWN9UGKJjrMNpQs02Lp3sNHPXySfzpl9w0Wsr9y59B6BUV4EjPXV7yCABjVOtgQLY5xycc8W/CNkb35yDxdlPbhlfGwAQ1Wyxt6vxRmM9V4JJbrcZR74uGO49cLAZtlDv6VhQiN2xeidy7OeEBNXpCcqenww1mdiZz1xx8uSkugokJTZsLhz8T5MYHP/egMolauxlLHuqGwE5is417aVtuuv1yJj3RF3iXb9k0qSMo11Y90Rc4l2DXr5BkMeGevGuqP//vz191+/uc7W9cIZc4LK9PvfP35d/sk8mDcyG8mLwJFZZ629us66sHEFQVavW73uqIkSxWSsG+uOmihRTMa6se6oiRLFZKwb646aKFFMxrqx7qiJEsVkrBvrjpooUUzGurHuKKNEu+0ZBZPo3gYbkc0wsAXr3G6sud9378dY70Ut0cKMjcjGQAbj0qVUWZdyYy0KgrHuKLFEfUZzGBp3qM7KCdvvLrB7myIK63JurNw7+I311a+xsI5nv4eSyiSycoh3S8xOFHBjZc/MMtYpR6QnOy4U2e4byM5kyrZUYF3QjZUj49ZYH6TIOqleZ8mi12Bd0o21PAjGuiNN1qcUngXugZ3AHO4oKqxLurGWB4GFdclX8+hdQpl1WGSsXb5hHLAunpTD9UqDdVE31vIg4KzH332DfDJzcCjXEkzz0WYdQgmafuXE4WaoyTr6KXFjZQgCW73eIfh4CoGocAlt1he9zBkosxPuj3UBN9ZaWG9FG4xNl7X4hIVzzp31YWTsSCX7MAeUIuuRtOsBdxIWVYxNRd1YKxmbtiI91lF3O4DAzN1e5hxF3VhtzpFVeqz3vc8o606LvJe1JFE3VltL4pR6HyZWcqzGpaDr+yXjxmp7BBhFd4aIsx4zLp021YT3fvEal4KWZ4aoG2thEMwzw1H23q/pQzEuxVcV2I1LQXGfo6QbK697q7G++rVE1tM2hyzJiN/AXnI1RN1YLVeDQQJeSJUYl4Ll4OGsI16E/e/VK79vyovoo5omnhd1g0KsWUu0KuNSMNaJrIdTabAdS1kKGHjr4c5ZonUZl4KxTmN96ieF/s4SC7cu9zdwS9sjMpZoZcalYKzjrPtVdfeX89Wz5Owaax4K0Z9NdPGFS3wlWptxKRjr6ax3hfd6+xn/o/+HrgJjCkSkj5uwaoNNSCVPTjVRopiMdXQeZl5bd12a8xcsHVFSK/UkH5VIv39n9XqFWmE9XkBNRCaJ9VmLPKvInd9AVJEl8UmxXciMw19cTZQopjjrKwXURGQSWF/2Uu6X4X+X/ZmIUur1yBgXm+vkVRMlisnqdZT1kWOvl9IPUr+SK3XCrSDhLk51S1MTJYrJ+utrrH+evbmzjvXT9XZm7UDjvZTU1Bsbm8ZkrK+wHuTD2cLB2KkYVpHm5RF/xzmzlL1L/b1fKX28rM0woMu6oCEr544g30fAOx22RbNIUSsBpYlqPe/SyPJwuOUpNC4FdY+7wKfYu5TbvXXJeugXSbG8SdTUWS+rvYqk5+cYSjsYT+vdQ/nmdVBiXdCQVcC9daN9jlXslNJknZAPz5CUBKo5eBKGrBKZWduwXsdOqQ28kBYKlRxHsilo5lZLGLKKZNxuwrrO9PmqqmSdxUQA6qvXSc8l46SwBeukMhPU5qyHVo5ZzGFAN7ea3ZBVxiFnC9ar6KzD9qwHzctZTL9Ab85RxJBVxvnMcvAoR3CyPkxAzZngMXME1fl1dkNWIUdLY51yBBvr6FT9zliXMWQ11tm1GeuxeeI99WHEDFmtD8OtbVhfWRDZ0dhUzpC1nbFpLdrwXQP4dfcz5yhoyNrOnGMtUmY9cTvNbtaSJA1Z21lLqkQbvGsg5djd7BGQNGRtZ49AHeJmHd2QPICeuKSwm71fkoas7ez9qkJa3qXe9u74eaDcuBTU5tcFDVnZ3VuN9dWvFXuX0lkfbs/9TsW5GoKGrCK5GgeUeZdiajsH74gy71JMxnprMu9STMZ6azLvUkzGemsy71JMxnpraqJEMRnrxrqjJkoUk7FurDtqokQxGevGuqMmShSTsW6sO2qiRDEZ68a6oyZKFJOxbqw7or+jvci71D2D/G4QnXe0+0raK6ESBHtHuyNqieZ7l/bSdO7chvWJS5R1tSAY644SS5TBzxFAfff2BqzPAhVmXTMIxrojVda1s3LUWR/u7RYxMFQNgrHuiF6ixTl4etmWuqw7uacRs07dIBjrjhTzTSvIoqco770a3eVw1pWDYPMwjhRZr8AdhSJSZBbvM8RZVw6Cse6oLtalXa8oIr9DxsGuiHXOIBjrjvRY38bNMD9JiuhJPRsmoqxrB8GLwJFZf368EtNDd8T612dBQmBSZBAvpGpY9yJwZNbhflFiXb8P83N9L8kdSYgMtoRcSx/Gj8ChWf+5vtMyRPczNr1fipJfEyITfWtncC1CNwh+BA7NOrmh382cI717ttB6ZOisqwYhEIFjs06drNjNWtL3uTDRO38ap5K1pEAEjs06tf4r8OlVXR4vGph2ym4ZYi851AtCKAIHZ504hsv0LgUA1W1PhZ31Trmj2+gLPbWCEIzA0VmHx+2U0PPD+qNJ3qWDlJw7i1aRFufJyNhYeXmtRhCQCBye9fVasNi7dCbxNIXC2UZXWe1DyouaZYOARcBYz67A/JOsT4SJi6tSn862t2Q8PALGOkBXExQO5qrwLi2eavTEEBlVxSJgrPcqHM/V4F3K2HtxxTLS1VE8Asb6qOfHa3ahbu9dKgQ6AJRFRk+rETDWZ8qsw7b2LpUEvVfltXtKBIz1pX6u74RXcG2ux+2k1XeqNDLJETDWTUeRsW46iox101H0PwEzWhmA6xM+AAAAAElFTkSuQmCC[/img]

2,60·500 + 1,80·600 + 1,20·800 + 1,00·400[br] =[br]3740,00