b) The rules of
apply to algebra
Answers
Answer:
it has many rules wt do u need. plzz mark me as brainlist
Step-by-step explanation:
Commutative Law For Addition {\displaystyle a+b=b+a}{\displaystyle a+b=b+a}
The arrangement of addends does not affect the sum. If {\displaystyle 2+3=5}{\displaystyle 2+3=5}, then {\displaystyle 3+2=5}{\displaystyle 3+2=5}
Commutative Law For Multiplication {\displaystyle a*b=b*a}{\displaystyle a*b=b*a}
The arrangement of factors does not affect the product. If {\displaystyle (2)(3)=6}{\displaystyle (2)(3)=6}, then {\displaystyle (3)(2)=6}{\displaystyle (3)(2)=6}
Associative Law For Addition {\displaystyle (a+b)+c=a+(b+c)}{\displaystyle (a+b)+c=a+(b+c)}
The grouping of addends does not affect the sum. If {\displaystyle (2+3)+4=5+4=9}{\displaystyle (2+3)+4=5+4=9}, then {\displaystyle 2+(3+4)=2+7=9}{\displaystyle 2+(3+4)=2+7=9}
Associative Law For Multiplication {\displaystyle (a*b)*c=a*(b*c)}{\displaystyle (a*b)*c=a*(b*c)}
The grouping of factors does not affect the product. If {\displaystyle (2*3)*4=(6)4=24}{\displaystyle (2*3)*4=(6)4=24}, then {\displaystyle 2*(3*4)=2(12)=24}{\displaystyle 2*(3*4)=2(12)=24}.
Distributive Law {\displaystyle a(b+c)=(a*b)+(a*c)}{\displaystyle a(b+c)=(a*b)+(a*c)}
Adding numbers and then multiplying them yields the same result as multiplying numbers and then adding them.