If we expand and simplify 2(x+5)+3(x−2)2(x+5)+3(x−2)2(x+5)+3(x−2) we will get 2(x+5)+3(x−2)=2x+10+3x−6=5x+42(x+5)+3(x−2)=2x+10+3x−6=5x+42(x+5)+3(x−2)=2x+10+3x−6=5x+4 What does expand and simplify mean? Expand...
8. Expand and simplify each of the following expressions.(a)4u-3(2u-5v)(b)-2a-3(a-b)(c) 7m-2n-2(3n-2m)(d) 5(2x+4)-3(-6-x)(e)-4(a-3b)-5(a-3b)(f) 5(3p-2q)-2(3p+2q)(g)x+y-2(3x-4y+3)(h) 3(p-2q)-4(2p-3q-5)(i) 9(2a+4b-7c)-4(b-c)-7(-...
Simplify (2x)^2. Simplify: \frac{4x^2 + 9x - 2}{x^2 + x - 2} \cdot \frac{x^2 - 1}{3x^2 + x - 2} How to simplify 2x^2 - 4? Let f(x) = 2x^2 - 3x^2 - 3x + 4, \; g(x) = x^2 -1. Find and simplify f(x) \cdot g(x). ...
Expand the brackets and simplify where possible: 2(3x + 2) - 3(2x - 3) Expand the brackets and simplify where possible: 3x(x - 2) + 2x(3x - 2) Expand the brackets and simplify where possible: 2x(x - 3) + 3x(3x - 2) How do you expand and simplify 3(2x - 1...
Since - 8x and 15x are similar terms, we may combine them to obtain 7x. In this example we were able to combine two of the terms to simplify the final answer. Here again we combined some terms to simplify the final answer. Note that the order of terms in the final answer does not ...
We may use both Theorems 1 and 2 to simplify polynomials.Example 7 Find the standard form.(a) (3 x)2 (2 x3) (b) (− 2 x)3 (5 x2-x+3)Solution(a) (3 x)2 (2 x3)=(9 x2) (2 x3)=18 x5(b) (− 2 x)3 (5 x2-x+3)=(− 8 x3) (5 x2-x...
Solution We need to add the amounts of the three checks and subtract the sum from the original balance. We therefore write $567.19 - ($18.50 + $24.95 + $129.40) = $567.19 - $172.85 = $394.34. The first step is to simplify what is inside the parentheses. ...
Answer and Explanation: Learn more about this topic: Evaluating Logarithms | Properties & Examples from Chapter 10/ Lesson 4 151K Understand how to evaluate logarithmic expressions, know how to solve logarithmic equations, and explore the various properties of logarithms that are used in evaluating ...
Use differentiation rules to find f′(x) (dont need to expand and simplify) . f(x)=(2x5+3x2)⋅(x3+1)⋅(1x) Logarithmic Differentiation: The given function is a product of three independent factors. We can differentiate in many ways...