Distributive Property for Multi-Step Equations
The Distributive Property is a fundamental concept in mathematics, particularly in solving multi-step equations. It states that when multiplying a sum by a number, each term inside the parentheses must be multiplied by that number individually before performing any addition or subtraction. This property plays a crucial role in simplifying expressions and solving equations involving variables. Understanding and applying the Distributive Property effectively allows for efficient manipulation of equations, leading to accurate solutions. In multi-step equations, its application streamlines the process of isolating the variable and finding its value, serving as a cornerstone in algebraic problem-solving.
Questions
- How do you solve #2(13t-15)+3(t-19)=0#?
- How do you solve #7(2+x)=35# using the distributive property?
- How do you solve #-7( - 7n - 3) = 168#?
- How do you solve #7p - ( 3 p + 4 ) = - 2 ( 2 p - 1 ) + 1 0#?
- How do you solve #6x = 4x - ( - 18)#?
- How do you solve #2(3x-1)+2(4x+5)=8#?
- How do you evaluate #\frac { 1} { 2} ( 4m - 6) = \frac { 2} { 3} ( 6m - 9) + 3#?
- How do you solve #2(2.5b -9) +6b =7#?
- How do you simplify? 5x+1(x+5+15) = x+5(5x+1+35)
- How do you use the tabular method to multiply and combine #(3m+m^2-2m-5)(m^2-5m-6)#?
- How do you solve #1.2(2m-2) = 15#?
- How do you solve #6x + 12= - 84- 10x#?
- How do you simplify #6( 3p + 7) \geq 7( 4p + 4) - 8p#?
- How do you combine #(3k + 4) ( 3k - 5)#?
- How do you simplify #3( 5x - 6) + 2( 6+ x )#?
- How do you solve #-\frac { 5} { 8} x - x = 1- \frac { 3x } { 2}#?
- How do you solve #-5(x – 4) + 2 = -13#?
- How do you solve # 5(2t - 1) + 3 = 3(3t + 2) #?
- How do you solve #-6v + 3( v - 2) = 18#?
- How do you solve #-9(-a – 1) = 8a + 14#?