The equation for determining the angle measures is:
(7x - 9) degrees + 4x degrees = ____ degrees
What is the equation for determining the angle measures?
(7x - 9) degree + 4x degree = ____ degree?
5 answers
What is the answer to the equation
To solve the equation, we need to combine like terms.
(7x - 9) degrees + 4x degrees = ____ degrees
Combining like terms, we have:
7x + 4x - 9 = ____ degrees
Combining the x terms, we have:
11x - 9 = ____ degrees
To determine the value of the equation, more information or additional equation is needed.
(7x - 9) degrees + 4x degrees = ____ degrees
Combining like terms, we have:
7x + 4x - 9 = ____ degrees
Combining the x terms, we have:
11x - 9 = ____ degrees
To determine the value of the equation, more information or additional equation is needed.
(7x - 9) degrees + 4x degree = _____ degrees
To determine the value of the equation (7x - 9) degrees + 4x degrees, we combine like terms:
(7x - 9) degrees + 4x degrees = 7x degrees - 9 degrees + 4x degrees
Combining the x terms, we have:
7x degrees + 4x degrees - 9 degrees
Simplifying further, we have:
11x degrees - 9 degrees = 11x - 9 degrees
Therefore, the equation (7x - 9) degrees + 4x degrees simplifies to 11x - 9 degrees.
(7x - 9) degrees + 4x degrees = 7x degrees - 9 degrees + 4x degrees
Combining the x terms, we have:
7x degrees + 4x degrees - 9 degrees
Simplifying further, we have:
11x degrees - 9 degrees = 11x - 9 degrees
Therefore, the equation (7x - 9) degrees + 4x degrees simplifies to 11x - 9 degrees.