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What are three forms of equations?
1. < less than 2. > greater than 3. = equal to
How do you find equation when 2 equations and 1 coordinate is given?
By solving the simultaneous equations the values of x and y should be equal to the given coordinate
How do you check 2 step equations?
11k+7.7=15.4
How does factoring help solve quadratic equations?
Well, that's one method to solve the quadratic equation. Here is an example (using the symbol "^" for power): solve x^2 - 5x + 6 = 0 Step 1: Convert the equation to a form in which the right side is equal to zero. (Already done in this example.) Step 2: Factor the left side. In this case, (x - 3) (x - 2) = 0 Step 3: Use the fact that if a product is zero, at least one of its factors must be zero. This lets you convert the equation to two equations; x - 3 = 0 OR x - 2 = 0 Step 4: Solve each of the two equations.
4x plus 6 equals 14 when are this 2 equations equal?
when x = 2
What two step equation equals 29?
One out of many examples of two step equations that equal 29 is: (9 x 3) + 2
What are some math equations that equal 7?
Some math equations that equal 7 include 3+4, 10-3, 14/2, and 2^3-1. These equations demonstrate different mathematical operations such as addition, subtraction, division, and exponentiation that can be used to arrive at the sum of 7. Mathematically, these equations represent various ways to combine or manipulate numbers to achieve the desired result of 7.
What are three forms of equations?
1. < less than 2. > greater than 3. = equal to
How do you find equation when 2 equations and 1 coordinate is given?
By solving the simultaneous equations the values of x and y should be equal to the given coordinate
What are 5 equations where the difference is equal to 3?
6-3=3 and 5-2=3 and 4-1=3 and 3-0=3 and 2-(-1)=1
How do you check 2 step equations?
11k+7.7=15.4
What is a 6 step equation that equals 1?
there are infinite equations. 7-1-1-1-1-1-1, 8-2-1-1-1-1-1, ...
How does factoring help solve quadratic equations?
Well, that's one method to solve the quadratic equation. Here is an example (using the symbol "^" for power): solve x^2 - 5x + 6 = 0 Step 1: Convert the equation to a form in which the right side is equal to zero. (Already done in this example.) Step 2: Factor the left side. In this case, (x - 3) (x - 2) = 0 Step 3: Use the fact that if a product is zero, at least one of its factors must be zero. This lets you convert the equation to two equations; x - 3 = 0 OR x - 2 = 0 Step 4: Solve each of the two equations.
How do you solve linear equations by using elimination?
You multiply one or both equations by some constant (especially chosen for the next step), and add the two resulting equations together. Here is an example: (1) 5x + 2y = 7 (2) 2x + y = 3 Multiply equation (2) by -2; this factor was chosen to eliminate "y" from the resulting equations: (1) 5x + 2y = 7 (2) -2x -2y = -6 Add the two equations together: 3x = 1 Solve this for "x", then replace the result in any of the two original equations to solve for "y".
Can someone prove that 2k2k plus 1-1 by induction?
To prove that 2k 2k plus 1-1 by induction is a step by step process. But the induction 2 is not equal to 2 to the power of 0 take away 1.
Who invented the 2 step equations?
The concept of solving 2-step equations, which involve two arithmetic operations to isolate the variable, is a fundamental concept in algebra. The invention of this method cannot be attributed to a single individual, as algebraic equations have been developed and refined over centuries by mathematicians from various cultures. However, the systematic approach to solving equations, including 2-step equations, can be traced back to ancient civilizations such as the Babylonians, Greeks, and Arabs, who made significant contributions to the field of mathematics.
Y plus 4 equals 4x-2?
That equation cannot be solved since there are 2 unknown in the equation (x and y) but only 1 equation. The number of unknowns must be equal to the number of equations (for simultaneous equations)
