How do you solve the system of equations s=4r-1 and 6r-5s=-23 by algebraic method?

2 Answers
Jim G.
Mar 17, 2017

(r,s)to(2,7)

Explanation:

Label the equations.

color(red)(s)=4r-1to(1)

6r-5color(red)(s)=-23to(2)

Solve using the color(blue)"substitution method"

"Substitute " color(red)(s)=4r-1" into equation " (2)

rArr6r-5(4r-1)=-23

distribute the bracket and simplify.

6r-20r+5=-23

rArr-14r+5=-23

subtract 5 from both sides.

-14rcancel(+5)cancel(-5)=-23-5

rArr-14r=-28

divide both sides by - 14

(cancel(-14) r)/cancel(-14)=(-28)/(-14)

rArrr=2

Substitute this value into ( 1 ) to obtain the corresponding value of s

rArrs=(4xx2)-1=8-1=7

rArr"solution " r=2" and " s=7

Richard G.
Mar 17, 2017

r=2,s=7

Explanation:

Substitute the given s-value into the second formula
6r-5*(4r-1)=-23
Multiply, then solve
6r-20r+5=-23

6r-20r=-23-5

-14r=-28

(-14r)/-14=(-28)/-14

r=2

Substitute this into the first equation.
s=4*(2)-1=8-1=7

Check by substituting both into the second formula
6*(2)-5*(7)=-23
12-35=-23. True

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