Mathematics, 27.06.2020 05:01 tyrique86
Explain why the slope of the tangent line can be interpreted as an instantaneous rate of change.
The average rate of change over the interval [a, x] is
StartFraction f left parenthesis x right parenthesis minus f left parenthesis a right parenthesis Over x minus a EndFraction ..
StartFraction f left parenthesis x right parenthesis minus f left parenthesis a right parenthesis Over x minus a EndFraction .f(x)−f(a)x−a.
StartFraction f left parenthesis x right parenthesis minus f left parenthesis a right parenthesis Over x plus a EndFraction .f(x)−f(a)x+a.
StartFraction f left parenthesis a right parenthesis minus f left parenthesis x right parenthesis Over x minus a EndFraction .f(a)−f(x)x−a.
StartFraction f left parenthesis x right parenthesis plus f left parenthesis a right parenthesis Over x minus a EndFraction .f(x)+f(a)x−a.
The limit
ModifyingBelow lim With x right arrow minus a StartFraction f left parenthesis x right parenthesis minus f left parenthesis a right parenthesis Over x minus a EndFraction
is the slope of the
line; it is also the limit of average rates ofchange, which is the instantaneous rate of change at
x=
Answers: 2
Mathematics, 21.06.2019 20:00, Jenifermorales101
It is given that the quadratic equation hx²-3x+k=0, where h and k are constants, has roots [tex] \beta \: and \: 2 \beta [/tex]express h in terms of k
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Explain why the slope of the tangent line can be interpreted as an instantaneous rate of change.
Th...
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