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Jefff find some bugs. He

  1. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25t𝐴 ( 𝑡 )
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    2. nut asked by nut
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  2. Jefff find some bugs. He finds 10 fewer grasshoppers than crickets. He find 5 fewer crickets than ladybugs. If Jeff finds 5
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    2. Anonymous asked by Anonymous
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  3. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25tcan represent
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    2. , asked by ,
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  4. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25tcan represent
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    2. views icon 36 views
  5. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation  A(t)=6(2)0.25tcan
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    2. :) asked by :)
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  6. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25tcan represent
    1. answers icon 1 answer
    2. views icon 39 views
  7. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25t can
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    2. views icon 56 views
  8. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25tcan represent
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    2. Blue Berry asked by Blue Berry
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  9. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)^0.25tcan
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    2. views icon 51 views
  10. The number of bugs doubles every 4 days. If the bug population starts with 6 bugs, then the equation A(t)=6(2)0.25tcan represent
    1. answers icon 1 answer
    2. views icon 63 views