Explain How Solving 161 Is Different From Solving 7Y

Ok so in the first case -7y > 161 how you calcule the y? In: Integers, Polynomials, and Rings. If you divide the first inequality by seven on both sides, you'll flip the sign. System of Equations - n equations with n variables. Check the full answer on App Gauthmath. Below is the best information and knowledge about explain how solving 161 is different from solving 7y compiled and compiled by the team, along with other related topics such as: which inequality is equivalent to the given inequality 4(x 7 3 x 2), consider the inequality -20. Click the card to flip 👆. Do you know this about what @Vocaloid talk above? Use a property of equality to solve each equation. But don't know how to put it in words. These keywords were added by machine and not by the authors. So inequality sign flips, We're over here, you would divide by seven, And the inequality sign is going to stay the same, but you still get -23.

1. Explain how solving 161 is different from solving 7.0
2. Explain how solving 161 is different from solving 7y answer
3. Explain how solving 161 is different from solving 7y 6
4. Explain how solving 161 is different from solving 7y using
5. Explain how solving 161 is different from solving 7y graph

Explain How Solving 161 Is Different From Solving 7.0

Enjoy live Q&A or pic answer. Imaginary Number - A number that involves i which is. Please help, Explain how solving -7y > 161 is different from solving 7y > -161. So this is about what above told @Vocaloid. Check all that apply., mercedes receives a $25 gift card, one student solved the inequality, one student solved the inequality x 7 and got 28 x, joseph received a $20 gift card, jose receives a $10 gift card, sara owns an exotic pet store. Divide both sides by -7 yes? So, your answer is: -7y > 161 is equal to y < -23, and 7y > -161 is equal to y>-23. By helping explain the relationships between what we know and what we want to know, linear inequalities can help us answer these questions, and many more!

Explain How Solving 161 Is Different From Solving 7Y Answer

Still have questions? Explain how solving -7y > 161 is differe – Gauthmath. Does the answer help you? Solve $$x + 5y = 14 for y. Rearrange: Rearrange the equation by subtracting what is to the right of the greater than sign from both sides of the inequality: 7*y-(-161)>0. In the given question, two equations numbered l and II are …. The solution to the first inequality is y > -23, and the solution to the second inequality is y <>. Quartic - A 4th power polynomial. Springer, New York, NY.

Explain How Solving 161 Is Different From Solving 7Y 6

Linear inequalities. Polynomials with Real Coefficients. Good Question ( 78). Coefficient - Number factor; number in front of the variable. Consistent - Has at least one solution. Then check the result. Quadratic Polynomial. They want to know how solving the first inequality is different from solving the second inequality. Good so just use this rule if you know - that s all. We think you wrote: This solution deals with linear inequalities.

Explain How Solving 161 Is Different From Solving 7Y Using

The inequality sign is still greater than this one. Extrema - Maximums and minimums of a graph. All I have is: Solving -7y > 161 is different from solving 7y > -161 because... @jhonyy9. The inequality sign is going to stay the same but you get -23.

Explain How Solving 161 Is Different From Solving 7Y Graph

Gauthmath helper for Chrome. Get 5 free video unlocks on our app with code GOMOBILE. Monomial - An algebraic expression that is a constant, a variable, or a product of a constant and one or more variables (also called "terms"). Linear - A 1st power polynomial. This is a preview of subscription content, access via your institution.

Create an account to get free access. Intercepts - Points where a graph crosses an axis. Complex Number - A number with both a real and an imaginary part, in the form a + bi. Find an equation to pair with 6x+7y=-4 such that (-3, 2) is a solution to both equations. This is why we need inequalities. Integers - Positive, negative and zero whole numbers (no fractions or decimals). Try Numerade free for 7 days. 1 Pull out like factors: 7y + 161 = 7 • (y + 23). Life is not binary (no matter how badly Tiger wishes it was) and we are often faced with questions with more than one answer.

AZ please can you explain here? Point of Intersection - The point(s) where the graphs cross. Step by step solution: Step 1: Pulling out like terms: 1. Step by Step Solution. Unable to display preview. Inconsistent - Has no solution.

Greatest Common Factor - Largest expression that will go into the terms evenly. Trinomial - The sum or difference of three monomials. Yes so that's all you have to write dividing by a negative number changes the sign so > becomes < and < would become > if you divide by a negative number. 2 Subtract 23 from both sides.

Quadratics Revisited Key Terms. © 2004 Springer-Verlag New York, Inc. About this chapter. Print ISBN: 978-0-387-40397-7. Grade 11 · 2021-07-15. Answered step-by-step. Provide step-by-step explanations. When you divide by a negative number, like –7, you must reverse the direction of the inequality sign. Like Terms - Terms having the exact same variable(s) and exponent(s). Constant - A term with degree 0 (a number alone, with no variable).