Question
What is the value of 40?
- 16
- 4
- 0
- 1
Hint:
Recall what the zero exponent rule states.
The correct answer is: 1
The zero exponent rule basically says that any base with an exponent of zero is equal to one.
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Identify the equation of this line.![](data:image/png;base64,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)
Identify the equation of this line.![](data:image/png;base64,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)
The function that best models the data set given.
![](data:image/png;base64,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)
An exponential function is a mathematical function of the following form: f ( x ) = a^x, where x is a variable, and a is a constant called the base of the function.
The function that best models the data set given.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASYAAAEZCAMAAAANNniQAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf///4WFhUFBQTQ0NDk5OTc3N09PTwAAACUlJSYmJhERERsbG1JSUgwMDKKiotDQ0Pz8/J+fn8zMzPr6+p6ensrKyr+/v6GhoaioqKSkpO/v7/7+/q2traenp52dncjIyK6urgMDA3t7e+zs7P39/ZKSkjExMb29verq6mBgYDw8PDs7O0VFRdTU1O3t7WRkZDY2NsvLywUFBUBAQHV1ddPT0/v7+7e3tyIiIouLi/f39wICAvPz8/Ly8iQkJBoaGtjY2ENDQ21tbRYWFggICLy8vMbGxgYGBoGBgc/PzwkJCRAQEMTExJycnElJSYCAgGdnZ3p6elZWVmNjY4qKivX19U1NTR0dHfb29jIyMgEBAbW1tePj4y8vLxwcHBkZGenp6ZiYmLu7u7q6uhcXF9ra2rKysgoKCkpKSmFhYSAgICoqKvDw8NXV1SMjI3h4eHNzc0RERLOzs/T09KmpqfHx8eLi4g4ODk5OToSEhExMTF1dXXR0dDo6OmhoaFxcXOTk5IKCgoaGhujo6H5+fsDAwKysrFlZWQsLC3JycgcHBwQEBJSUlDAwMCkpKUhISLGxsVNTU87Ozvn5+VBQUJqamsXFxY+Pj1RUVEJCQrCwsFhYWA0NDaqqqtnZ2eXl5bi4uNbW1hMTEx8fH0dHR7S0tNHR0cPDw3Z2dtfX18nJyVFRUXl5ec3NzZubm46Ojh4eHj4+Puvr6xgYGOfn5xQUFEZGRra2tpOTk3FxcXx8fN3d3e7u7tzc3Dg4OD8/P29vbysrK9/f3+bm5oyMjODg4OHh4aOjo4mJidvb2y4uLr6+vlpaWmZmZiEhIcfHx2pqand3d2JiYhUVFfj4+BISEg8PDzMzM25ubj09PX9/f4eHh7m5uZeXl5aWlicnJ97e3qampigoKJmZmaWlpcHBwWVlZYiIiKCgoDU1NWtraywsLC0tLUtLS9LS0ltbW6+vr8LCwldXV3BwcF9fX1VVVZWVlaurq4ODg15eXpGRkY2NjZCQkGxsbH19fQAAAOvi/BoAAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAALqElEQVR4Xu2dQXaruBKGPdM5Gmo1Wg87YEFaibQFBoy0AAasgPkrgcBOOjf53fn14NL1OZ0Qn9w2/lwqCSiJh6IoiqL8R5j7fC3O35+5qnmlN/5SWGPr1lmYpap5ZTF14yIEE+vWWfwVmibj6tZZqCYI+6UmWzcugkYTRFBNCBpNEKoJQjVBqCYI1QShPR2ERhOEaoJQTRCqCUI1QagmCNUEoZogVBOEaoJANHVTCFNID/kWJrrV22gK1hgzpsckP31Xn6TB0pSWctGvj9tP8qcJNbpgTF9+DsbyL1fRoqnz8mnOEvTlQ63PscBykze2/Flvhu13JrxG5yTaZTedMaE+QwPTNK6v7DZZZIi5SeIolw/zq8vtvwPTFE2Jo/HLd/RbiJrkn5kwtgh5TFPqjS1Nj56/BaamlI23OdXfiGCa5M+M60pE82FqenSSnuiJSQA1RW/msckOkDVJL9efF00yFvC+RTRzNTmfpbdhjwYEVFMZjEx1mwtRk6TQ8Mgtmh2qSV7dt6mEImoayv9LPlAPviccWFOL0cgKT9O8ji7l3/LTE6op2gbHKSssTUn0lCPP9Zglk3cW1bR8+W4Y0DSN4zzKId0k3+eRPMJDNIUlhBYHvRu8RtcQRNMgUdyomxNuoylk37c4TNm4jaa2qCYI1QShmiD+Ck1XLQOzMo5ev67wKNHUvfz+p8f2xX5sfKHJlRGIslFHYl9oios1y0UY1u/Z9OvP/fc/fd/4/m/e/F5Pd/yh0dWNi6ATxSC0p4NQTRBaFw6h0QShmiBUE4RqglBNENrTQWg0QagmCNUEoZogVBOEaoJQTRCqCUI1QagmCFRTdCF0TYzeR1MKSy6zoOzSQNRtNMVsTN9FN4oovieaphSd26+RskE0ObvNEyszfL56T7+DpanrJd792OZ6GqRpq5BdN/iXGUmaJmPnLlh6ceoGoilN9QJt8sbQw5qjqTPrvKPONoh3AUrhO6LpqtHU17wwnDq1Z0Ma3bYzTCiaJJi2yo3QZMrKe5okhfNLVSma5n3PknQ3Dbq7dzRJj9eg4VM0LXvSFE0t5ta8oSnt7Z8LRZOM7GoMybDgjfaB8oamsc0cKIamKDF0EU1zg/lXBYamZMw+J1Ka35maZPjWxBInmp5d8LnRJOPbRvMxSNG0N7pTo8n5NvOhBVI0lQrpwpnRlPI+N5N/DM7QVHq62r30Taa0YZqGfaUI5+lBRWl0zxjyRzJnAmnq9qFAWvgRTYmmbREXQYaXX/3/fguiST4rvyy9PCS26Ymcouk4lJONsw59p3VSQOWa0STJc8vhw9HlUUE0hXWZre0GPz09P1I0lSgq6bPVuAVL4S3haCoh34+DbTQn+TaaHt1grR8bvZv7aGqKaoJQTRCqCUI1QagmCNUEoZogVBOEaoJQTRCqCUI1QagmiHc0jX5ocGbwbpo62+Sixc00pVLPW7eZEDWlsUUJWAHXNJqLR1MKvsXC8yuwJmfGC9c3Ca43bQoKC7CmbNJy4WiKo/X+fE2jmWXfLxtNMds5NSpPLYCanF3vzHHZaIqzvA3pihst1g1qSn25Spgv3tOJpnOjaSpdiIwIWtQS30eTs6UipWiqTzC5j6Z+u+ScS25K7CICoiZzam4KNYrWaMrsEdxdoilaM0zTPM3e+Omom6NB1XRiNHXGrpTqJmsse09uk5tSRXJTlB/1WRa3yU0V7ekwJJrqFpO7adJognDS0+GhB3Oz3DSVmwZZfjUxNZpOPy33cF2BH04cTdIDl/NyvpO+uD7F5J0U3gaOpimXYBd8Hht4uosmNwmhfNsXTaByF02NUU0QqglCNUGoJgjVBKGaIFQThGqCUE0QqglCNUGoJghUU+zk2LtrsKzGnTTF0ZdrdKbFuZz7aHLZ5C5GNxhz1XUIHo8Uy8nVFqcuBUTTeh1z3RobnJTnaHJzv56+7M9bh+BZrPeyhhsNiqZZMsLs3CyqmlxcQTQdy9mUtZ6vqWmpa9w40YUk23cBNdVQluZ3SU1p2eO9P/aVCqJpOhpdiwVCKdHUzbVreX6kVMAUXhcimxssV0jRdHCipkfnjQ8pucF6/rI/XE3S6FqsTARpWtduK1y7hkCQrpieFQqYppDtMk2Dl1FmfYYHVdPQaBFTSNNo7KpHxgPXzk3S2bS45otp6o6eTgaa9JgmapKOuM0gHNIkvUdta88+jwdPk/OnloEttc2tqZze6miaYt/MEqRpeHayYuyqmmQkTk8IB6Cm/WBF+rptiwdL09Bk4lEFTOG1NrXFxD6Spnmf7EefVFNANJUcvpR9CC0GbxxN0snVN7Ksu0oG0lRO59i8eGuuepJX+paaF7omZaqYpkeclr5fphbxTNFUBnTDUmhTGw5qaghDU7k51cGJ0dQQiqbs18f6ddqJlKZwUnhjVBOEaoJQTRCqCUI1QagmCNUEoZogVBOEaoJQTRCqCUI1QSCauvy5As3NvWWd/bqJJrd8vuJcSlVzzyreu4WmVKoaP9bCBG/6wDsnTtIUw5BzHtqUEPygKQVvF/H0qmkmX4SiaHKjNbmcCG9QkV34XlNn5VWP256vBHatLENTksSw7pWkgxbXn37QFEsMT6+a+HVWlGg6FnjNR70DlZ9T+Mdo4tdZUTSN+xo3ElYnXTJ41dSglJei6eBZ70DlTU1rOVpyIfAmQ3E1tbn78buaeuPdnMtFQ9rkEKqmFoXrBUDTSwov1XI+j123zhGpT/4SpqbYZtngd6PJeWO2u2N0dr9z9G/haYpTtmOTYdObmoqcujmywomlaS4LXZ24aNpHTftihTLM5OwTS9OYeyuf4nxWo3vJTTK43DU9S+h+CTM3BeldmgTUe9EkKXKvvRRN14qmFeljzro1++uAYDkSN+3Yjqqp7OxJ9U2vx3Tr8HJlYY3juJpk4NRiSABo+tCnycBktUNrcxRNKUzVjTslmmJ0ZSTpg4tb7MjIKYeuE3Wsu4tRNPk9yCXcScPeD/ygafDl5KVgfX31WFZuMGahJUqKJula1k+tbLQYYP6gyXWu8jzWTfIbcVdImkwfopMBQYP5owKQmxpDSeFh2OaP+rHN27mJphLjXQhdkyG4cBtNbVFNEKoJQjVBqCYI1QShmiBUE4RqglBNEKoJQjVBqCaIHzW5MM/z65F3LE8E3gmnG2hKU+/L3SBtricr07TIE+W0L+2y4d+vqZwUHGKKk601aKV4L3cpdp5XgMnUlAIxzF/5XpOv76ETO+vGfp0uSkCRkhpT0+slRSrfa7L1VWVjvSon4VXLmiTOSDtE1OTkw2txzfen3OR2FdLY1r+LezIfaTvE01RSwhnRdBC9sXWz8rL01S/haZpMo1UvUU2Smz5lbPFGSpY0Tc72sp8najquFh4Q17uiaVqMc+fkppXk+jLZ4JV/evv3sDRN8sGdFk2pm6XBf74sP7IKLwWSpmRtKkF+jqYoPb8x/ccx92spz68haVrKUOWccZOQonNBOtrXRYuDZd7el6MprCWOp2nakPB55iIZxDHnO1A0yYilZIGTNZWFsPcAcp5bQUTRNG4d75oNYoPacExT+ZjqAEA6OW6dFUNTV6qaUlqPDdJgWJ3wk281pePG1PIxVU3DXrTnIL8/w9DkJXkWyhke+e//rMnZ/T4YxyHcdNwaI3/19v4FDE3zuCHd8jKODaoKv9e0T047hpOSKkMJspRGVtuj5KaKBD0pxj/xQzRtQRRlRLD1IKOxeYNWCsrUdE5PF5fS6LM093579eLt4JrRdMqAIIV5WZZxf+24LegqyAZph8jRdNqhb2OImsop+gb37hDupMn1uc954A8ubxZN7VBNEKoJQjVBqCYI1QShmiBUE4RqglBNEKoJQjVBqCYI1QShmiBUE4RqglBNEKoJQjVBqCYI1QShmiBUE4RqglBNEFfV9GmKzNmEq0ZTjNGVL3mc+LXtQ4yjCafsy/pYv77UtC2BprzwlaZuvhhT/XkaU5v6ttvyePwPAZ9xMn4d8jQAAAAASUVORK5CYII=)
An exponential function is a mathematical function of the following form: f ( x ) = a^x, where x is a variable, and a is a constant called the base of the function.
Write a quadratic function for the maximum height, if the initial velocity is 150
, the initial height is 30 ft.
We have, h = ut - 1/2gt².
Write a quadratic function for the maximum height, if the initial velocity is 150
, the initial height is 30 ft.
We have, h = ut - 1/2gt².
Determine the coefficient of the x5y7 term in the polynomial expansion of (m + n)12.
Determine the coefficient of the x5y7 term in the polynomial expansion of (m + n)12.
Find the first four terms of the expansion .
Find the first four terms of the expansion .
If the general term is 91C2 x89, what is the expansion?
If the general term is 91C2 x89, what is the expansion?
Use polynomial identities to factor each polynomial.
Use polynomial identities to factor each polynomial.
What is the fourth term of (x – 5y)96?
What is the fourth term of (x – 5y)96?
Find the coefficient of x8 in the expansion of (x + 2)11.
Find the coefficient of x8 in the expansion of (x + 2)11.
What do we get after expanding (p + 3q - 2z)2?
What do we get after expanding (p + 3q - 2z)2?