SOLUTION: Solving using the multipication principle. -2x>1/9 The solution set is {x|x _ __}. Type an inequality symbol and a fraction.

Algebra.Com
Question 223302: Solving using the multipication principle.
-2x>1/9
The solution set is {x|x _ __}.
Type an inequality symbol and a fraction.

Answer by stanbon(75887)   (Show Source): You can put this solution on YOUR website!
Solving using the multipication principle.
-2x>1/9
---
Divide both sides by -2 to get:
x < -1/18
----------------------
The solution set is {x|x < -1/18}.
====================
Cheers,
Stan H.

RELATED QUESTIONS

Solve using the multiplication principle -2x > 1/9 The solution set is {x|x__ ___} (answered by rapaljer)
solve using the multiplication principle -7x > 1/15 the solution set is {x x_ _ }... (answered by user_dude2008)
solve using the addition and multiplication principle 2 + 6x < 32 the solution set... (answered by user_dude2008)
Solve using the addition and multiplication principles. 5+2x<23 The solution set is (answered by Edwin McCravy)
It s ay solve using the multipication principle and perform a check -1/2x=-5/6 it also... (answered by stanbon,Fombitz)
Solve using the addition and multipication principles. 6 - 6x > 1 - 5x The solution (answered by jim_thompson5910)
-7x>1/15 i have to type an inequality sign and a fraction the solution set is {x|x__... (answered by stanbon)
Solve. The > have a line under it -3/2x>-1/4 The solution set is ___ ___ (simplify... (answered by Alan3354)
5(r-6) + 4 > 6(r + 3)- 28 The solution set is {r|r ___, ___ Type an inequality... (answered by stanbon)