The combined area of the two eqivalent tails is equal to .
(a) Find the two values one is positive and one is negative.
The combined area of the two eqivalent tails is equal to then the each tail have .
Hence the two values are and .
Using the graphing calculator the two values are and .
The combined area of the two eqivalent tails is equal to .
(b) Find the two values one is positive and one is negative.
The combined area of the two eqivalent tails is equal to then the each tail have .
Hence the two values are and .
Using the graphing calculator the two values are and .
The combined area of the two eqivalent tails is equal to .
(c) Find the two values one is positive and one is negative.
The combined area of the two eqivalent tails is equal to then the each tail have .
Hence the two values are and .
Using the graphing calculator the two values are and .
(a) The two values are and .
(b) The two values are and .
(c) The two values are and .
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