m<1=(5x-35) m<=(x+65)
To solve problems quickly you must have simple but effective method.
Diligent study for a number of years has given me the tools I need to solve most math problems I encounter.
ill-structured problems
Usually you can not solve math problems with more than eight numbers at a time It is usually that way with most calculators
There are different procedures for different problems!
Alternate angles are pairs of angles that are formed when a transversal intersects two parallel lines. There are two types of alternate angles: alternate interior angles, which lie between the two lines on opposite sides of the transversal, and alternate exterior angles, which lie outside the lines on opposite sides of the transversal. When the lines are parallel, these angles are equal in measurement. This concept is commonly used in geometry to solve problems involving angle relationships.
A line that cuts two parallel lines is called a transversal. When a transversal intersects two parallel lines, it creates several angles, including corresponding angles, alternate interior angles, and consecutive interior angles, which have specific relationships and properties. These relationships are often used in geometry to prove the parallelism of lines or to solve for unknown angle measures.
To solve real-life problems involving angle relationships in parallel lines and triangles, first, identify the parallel lines and any transversal lines that create corresponding, alternate interior, or interior angles. Use the properties of these angles, such as the fact that corresponding angles are equal and alternate interior angles are equal. For triangles, apply the triangle sum theorem, which states that the sum of the interior angles is always 180 degrees. By setting up equations based on these relationships, you can solve for unknown angles and apply this information to the specific context of your problem.
Parallel lines never meet and so parallel equations do not have any simultaneous solution.
hello im not smart so i dnt know
hi,if you can solve part 9 problems send it to me..i need to this very bad :( i cant solve it! i wait your reply Amir.karbalaii@hotmail.com
-10+6=-4
Here are some series-parallel circuits practice problems you can solve to improve your understanding of electrical circuits: Calculate the total resistance in a circuit with two resistors in series and one resistor in parallel. Determine the current flowing through each resistor in a circuit with three resistors in parallel. Find the voltage drop across each resistor in a circuit with two resistors in series and one resistor in parallel. Calculate the total power dissipated in a circuit with resistors connected in both series and parallel configurations. Determine the equivalent resistance of a complex circuit with multiple resistors connected in series and parallel. Solving these practice problems will help you develop a better understanding of series-parallel circuits and improve your skills in analyzing and solving electrical circuit problems.
To determine the value of ( x ) that makes lines ( a ) and ( b ) parallel, you need to ensure that their slopes are equal. If you have the equations of the lines in slope-intercept form ( ( y = mx + b ) ), set the slopes ( m_a ) of line ( a ) equal to the slope ( m_b ) of line ( b ) and solve for ( x ). If the lines are in a different form, you may need to convert them to slope-intercept form or calculate the slopes based on their given equations. Once you find the value of ( x ) that satisfies this condition, the lines will be parallel.
Sometimes diagrams help if you are a visual learner. Or if you need to organize your data like from a transversal line.
You have to split the oblique line. Ex: Name the oblique line Fz You'd have to split Fz in 2 lines : FzX and FzY(Which are parallel to the other 2 lines) Then you can solve the quesion :)
no she did not solve any of his problems