Algebra includes all the concepts like variables, constants, expressions, exponents, equation and etc . Variable is one of the main terms in math. Variables do not change the meaning of the expressions. Generally algebra expression includes variables. Commonly variables can be represented using alphabets. Here is the example, 2y^2+4y+2.Here we are going to learn about solving for a specific variables.
I like to share this Different Types of Variables with you all through my article.
Simple Example Problems of Solving for a Specific Variable:
Example 1:
A= bc then solve for b .
Solution:
Step 1: divide using c on both the sides .
Step 2:So, A/c = (bc)/c . (c term will be cancelled )
Step 3:therefore, the value of b is A/c .
Example 2:
P= 2l+2w Solve for w.
Solution :
Step 1: the given question is p= 2l+2w .
Step 2: p-2l =2l-21+2w.(Subtract 2l on both the sides )
Step 3: When we simplify we get p-2l=2w.
Step 4: (p-2l)/2 =(2w)/2 (Divide using 2 on both the sides)
Step 5: Therefore the value of w is (p-21)/2 .
These are the simple examples of solving for a specific variables.
Some more Examples of Solving for a Specific Variables.
Example 3:
Q=(c+d)/2 then solve d.
Solution :
Step 1: The given question is q= (c+d)/2 .
Step 2: Multiply 2 on both the sides. So, 2q=(c+d) /2 xx 2 .
Step 3: When we simplify we get 2q= c+d.
Step 4: Subtract c on both the sides . So 2q-c=c-c+d.
Step 5: Therefore, the value d is 2q-c
Example 4:
V= (3k)/t then solve t .
Solution :
Step 1: Multiply t on both the sides Vt = (3k)/t xx t
Step 2: When we simplify we get Vt = 3k.
Step 3: Divide using V on both the sides. So (Vt)/V =(3k)/V
Step 4: Therefore, the value of t = (3k)/v .
I am planning to write more post on prime factorization of 72 and how to do standard deviation. Keep checking my blog.
Example 5:
Q =3a+5ac then solve a.
Solution:
Step 1: The given question is q= 3a+5ac .
Step 2: Here a is a common term. Take the common term as outside.
Step 3: Now we have q= a(3+5c). (divide using 3+5c on both the sides).
Step 4: (q)/(3+5c) = (a(3+5c))/(3+5c) .
Step 5: When we simplify we get (q)/(3+5c) = a. Therefore the answer is (q)/(3+5c) =a.
These are the example problems of solving for a specific variables.