Question
The unit rate in the equation, y = 5x is
- 5
![1 fifth](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAIJJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CoZCDI4WZDQw6BcQfwLibUBcBMQ8lBjIAsTG0IbEDSDWoIYr3YD4ILW8/IMahugA8V1SNa0DYksgZoJiD6ghQaQaFArEt4D4DxC/A+JVQGyKTwMAfKc5il4VJDgAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+NTwvbW4+PC9tZnJhYz48L21hdGg+Xdkl9QAAAABJRU5ErkJggg==)
- - 5
![fraction numerator negative 1 over denominator 5 end fraction](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAB8AAAAjCAYAAABsFtHvAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAJJJREFUeNpjYKA+UAPiWiC+wDAAYDEQpwHxf4YBBKOWDz3L/xOBR4N91PIBt5zUhDkKRsHgSKW0wqNgFAz9XDFaVY5aThPLfwHxJyDeBsRFQMxDb0ewALExtFN4A4g1Bio03ID44EBGx4+BslgHiO/Sw6J1QGwJxExQ7AG1OIgelocC8S0g/gPE74B4FRCbkmMQAAg+T3TJ3EloAAAAeXRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtZnJhYz48bXJvdz48bW8+LTwvbW8+PG1uPjE8L21uPjwvbXJvdz48bW4+NTwvbW4+PC9tZnJhYz48L21hdGg+QMKwRwAAAABJRU5ErkJggg==)
Hint:
Use ratio y:x to find the answer.
The correct answer is: 5
Related Questions to study
The unit rate of the table below is
![](data:image/png;base64,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)
The unit rate of the table below is
![](data:image/png;base64,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)
Solve the equation -14 + 6b + 7 – 2b = 1 + 5b
Solve the equation -14 + 6b + 7 – 2b = 1 + 5b
Solve the equation 6r + 7 = 13 + 7r
Solve the equation 6r + 7 = 13 + 7r
Solve the equation 5 + 3x = 2x + 6
Solve the equation 5 + 3x = 2x + 6
Solve the equation 38 + 7k = 8(k + 4)
Solve the equation 38 + 7k = 8(k + 4)
Solve the equation 8x + 4(4x – 3) = 4(6x + 4) – 4.
Solve the equation 8x + 4(4x – 3) = 4(6x + 4) – 4.
Solve the equation 7a – 3 = 3 + 6a
Solve the equation 7a – 3 = 3 + 6a
Solve the equation 4n – 40 = 7(-2n + 2)
Solve the equation 4n – 40 = 7(-2n + 2)
Solve the equation 6 – 4x = 6x – 8x + 2
Solve the equation 6 – 4x = 6x – 8x + 2
Solve the equation 5.3g + 9 = 2.3g + 15
Like terms are the terms having same variable of same power in which the coefficient may not be the same whereas unlike terms are the terms which don't have same variable. Addition and subtraction are possible in like terms but not in unlike terms.
Solve the equation 5.3g + 9 = 2.3g + 15
Like terms are the terms having same variable of same power in which the coefficient may not be the same whereas unlike terms are the terms which don't have same variable. Addition and subtraction are possible in like terms but not in unlike terms.
Solve the equation 6 – 6x = 5x – 9x – 2.
Like terms are the terms having same variable of same power in which the coefficient may not be the same whereas unlike terms are the terms which don't have same variable. Addition and subtraction are possible in like terms but not in unlike terms.
Solve the equation 6 – 6x = 5x – 9x – 2.
Like terms are the terms having same variable of same power in which the coefficient may not be the same whereas unlike terms are the terms which don't have same variable. Addition and subtraction are possible in like terms but not in unlike terms.