\left. \begin{array} { l } { f {(x)} = -4 x - 4 }\\ { g = f {(-\frac{1}{5})} }\\ { h = g }\\ { i = h }\\ { j = i }\\ { k = j }\\ { l = k }\\ { m = l }\\ { n = m }\\ { o = n }\\ { p = o }\\ { \text{Solve for } q \text{ where} } \\ { q = p } \end{array} \right.
Solve for f, x, g, h, j, k, l, m, n, o, p, q
q=i
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h=i
Consider the fourth equation. Swap sides so that all variable terms are on the left hand side.
i=g
Consider the third equation. Insert the known values of variables into the equation.
g=i
Swap sides so that all variable terms are on the left hand side.
i=f\left(-\frac{1}{5}\right)
Consider the second equation. Insert the known values of variables into the equation.
-5i=f
Multiply both sides by -5, the reciprocal of -\frac{1}{5}.
f=-5i
Swap sides so that all variable terms are on the left hand side.
-5ix=-4x-4
Consider the first equation. Insert the known values of variables into the equation.
-5ix+4x=-4
Add 4x to both sides.
\left(4-5i\right)x=-4
Combine -5ix and 4x to get \left(4-5i\right)x.
x=\frac{-4}{4-5i}
Divide both sides by 4-5i.
x=\frac{-4\left(4+5i\right)}{\left(4-5i\right)\left(4+5i\right)}
Multiply both numerator and denominator of \frac{-4}{4-5i} by the complex conjugate of the denominator, 4+5i.
x=\frac{-16-20i}{41}
Do the multiplications in \frac{-4\left(4+5i\right)}{\left(4-5i\right)\left(4+5i\right)}.
x=-\frac{16}{41}-\frac{20}{41}i
Divide -16-20i by 41 to get -\frac{16}{41}-\frac{20}{41}i.
f=-5i x=-\frac{16}{41}-\frac{20}{41}i g=i h=i j=i k=i l=i m=i n=i o=i p=i q=i
The system is now solved.
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Simultaneous equation
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Integration
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Limits
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