use factors 7 and 6 to show an example of distributive property or multiplication
Simplify the expression. First use the distributive property to remove parenthese 6(x + 2) - (2x - 8)
Tutorial Exercise Use the distributive property to write the expression without parentheses. Simplify the result, if possible. See Examples 3-4. (Objective 3) -8(a2 -a + 5) Part 1 of 2 To apply the distributive property, multiply 8 by each term within the parentheses. -8(a2 a5)(8)(a2)(8) 8a x )(s) Submit Skip (you cannot come back Need Help? Talk to a Tutor
use distributive properties and other multiplication to finish each equation USING X2ND POWER +XY=X(X+X) a=(XY)=Y 2ND POWER B. *XY)+X C. A 2ND POWER + AB 2ND POWER
Previous Problem Problem List Next Problem (1 point) Use the distributive property to simplify the expression completely. 3 - (-9 – 52) wetwork / 2020_summer_mat1505_0503_featherstonhaug / algebra_2.1/1 Algebra A.1: Problem 1 Previous Problem Problem List Next Problem (1 point) Use the distributive property to simplify the expression completely. 3-(-9 - 50) Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining. Email WebWork TA
how that scalar multiplication is commutative and vector multiplication is not. That is, show that 6. S
Part 1 –Describe John Rawl’s “distributive justice.” Use an example from the text. What is Rawl’s “Veil of Ignorance?”
7. Use the properties of the probability functions to show the last property:
Is 3 a generator for the group of multiplication modulo 7? Show why this is or is not the case.
7) What are the government restrictions on the use of property? Give a useful example of each as it would pertain to an owner-occupied single-family home. 8) Give the Description if Lot 8 on the Subdivision Plat. You can call the subdivision whatever name you choose.
Show that the set of matrices of the form where a, b ∈ Q is a field under the operations of matrix addition and multiplication. (abstract algebra) please show the following axioms (closure, identity, associative, distributive, inverse, and commutative) for addition and multiplication a 6 26 a