All Algebra II Resources
Example Questions
Example Question #801 : Basic Single Variable Algebra
Solve for x and y.
Solve for x and y by using substitution. Solve the first equation for x.
Next substitute x into the second equation and simplify,
Now use the value for y to solve for x.
Example Question #462 : Equations
Solve for x and y.
Solve for x and y by using substitution. Solve the first equation for x.
Next substitute x into the second equation and simplify,
Now use the value for y to solve for x.
Example Question #463 : Equations
Solve for x and y.
Solve for x and y by using substitution. Solve the first equation for x.
Next substitute x into the second equation and simplify,
Now use the value for y to solve for x.
Example Question #331 : Solving Equations
Solve for x and y.
Solve for x and y by using substitution. Solve the first equation for x.
Next substitute x into the second equation and simplify,
Now use the value for y to solve for x.
Example Question #465 : Equations
Solve for x and y.
Solve for x and y by using substitution. Solve the first equation for x.
Next substitute x into the second equation and simplify,
Now use the value for y to solve for x.
Example Question #466 : Equations
Solve for given:
In order to solve an equation for an unknown it must first be simplified by combining like terms.
In the case of
Terms can be organized into those which have the variable in them and those that don't.
First can be added to giving , while is subtracted from , giving you:
Subtracting from both sides gives you:
In order to solve for you can multiply both sides of the equation by which gives you the final answer of .
This can be double checked by plugging it into the original equation:
thereby proving is a valid answer
Example Question #467 : Equations
Solve for ,
No solutions
(1)
When solving a radical equation the fist step is always to isolate the radical. Subtracting from both sides of equation (1).
Square both sides and expand the right side,
Collect all like-terms on onto one side of the equation and use the quadratic formula to find the roots:
(2)
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Reminder
Recall the general solution for the quadratic equation,
(3)
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Use equation (3) to write the solutions to equation (2) and simplify:
Therefore, the roots to the quadratic equation (2) are:
These represent two possible solutions to equation (1). We must check both of them. This is because one of the steps in solving the original equation involved a squaring operation, which can produce fictitious solutions.
Therefore, the only solution for the for equation (1) is:
Example Question #332 : Solving Equations
Solve for .
Putting like variables on each side we get , and divide each side by , getting .
Example Question #5 : Linear Systems With Two Variables
Solve the system of equations:
Solve using elimination:
multiply the 2nd equation by two to make elimination possible
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subtract 2nd equation from the first to solve for
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Substitute into either equation to solve for
Example Question #4 : Linear Systems With Two Variables
Nick’s sister Sarah is three times as old as him, and in two years will be twice as old as he is then. How old are they now?
Nick is 3, Sarah is 9
Nick is 2, Sarah is 6
Nick is 4, Sarah is 12
Nick is 4, Sarah is 8
Nick is 5, Sarah is 15
Nick is 2, Sarah is 6
Step 1: Set up the equations
Let = Nick's age now
Let = Sarah's age now
The first part of the question says "Nick's sister is three times as old as him". This means:
The second part of the equation says "in two years, she will be twice as old as he is then). This means:
Add 2 to each of the variables because each of them will be two years older than they are now.
Step 2: Solve the system of equations using substitution
Substitute for in the second equation. Solve for
Plug into the first equation to find