First off, what you wrote is ambiguous. Taken literally, what you wrote is ##\frac{a}{a}s + 1 = s + 1##, if a ≠ 0.tranceical said:Hi guys,
please could someone tell me how this is equivalent and/or what the algebraic rule is?
how is this: a/as + 1
is equivalent to this: 1/s+1/a
a/(as + 1) = a/[a(s + 1/a)]tranceical said:Thanks for the replies. Sorry for the ambiguity i should have used parentheses.
Mark44 - What i meant: how is a/(as+1) equivalent to 1/(s+(1/a))
I explained that above.tranceical said:Me_student - i understand a/as=1/s but i don't understand how the other
terms equal? i.e. how does the +1 term from a/(as+1) become 1/a?
Algebraic equivalence refers to two or more mathematical expressions or equations that have the same value or solution. This means that they are equivalent and can be used interchangeably in calculations.
To prove algebraic equivalence, you must show that both sides of the equation or expression simplify to the same value. This can be done through various algebraic operations, such as combining like terms, factoring, or using the distributive property.
One example of algebraic equivalence is the expressions 2x + 4 and 6x - 8. Both of these expressions simplify to 2x + 4, showing that they are equivalent.
Some common mistakes when dealing with algebraic equivalence include forgetting to distribute a negative sign, not simplifying fractions, or making errors in factoring. It is important to carefully check each step and use algebraic rules correctly to avoid these mistakes.
Algebraic equivalence is used in various real-life situations, such as in finance, engineering, and physics. For example, it can be used to calculate compound interest, design circuits, or solve equations representing physical laws. It is an essential concept in many fields that require mathematical modeling and problem-solving.