I'll be glad to do that, but first you need to try to independently answer as many of the following questions posed i as you possibly can. Without identifying the specific properties of the graph, you won't be in a position to understand the explanation. Where is the 'blue' graph positive, and where is it negative? Where is the 'black' graph positive, and where is it negative? If you multiply or divide the two graphs, the result is positive where both graphs are either both positive or both negative, and the result is negative where the two graphs have different signs. Where therefore is a quotient graph positive and where is it negative? If you divide a y value by a number whose magnitude is greater than 1, will the resulting y value be closer to of further from the x axis than before? If you divide a y value by a positive number, is the result on the same side of the x axis as before, is it on the opposite side, or does the answer depend on whether the original y value is positive or negative? Where is the magnitude of the y value of the 'blue' graph greater than 1, and where is it less than 1? If you divide y values of the the 'black' graph by the corresponding y values of the 'blue' graph, where will the resulting graph be closer to the x axis than those of the 'black' graph, and where will they be further? *@ " Self-critique (if necessary): ------------------------------------------------ Self-critique rating: #*&!
I'll be glad to do that, but first you need to try to independently answer as many of the following questions posed i as you possibly can. Without identifying the specific properties of the graph, you won't be in a position to understand the explanation. Where is the 'blue' graph positive, and where is it negative? Where is the 'black' graph positive, and where is it negative? If you multiply or divide the two graphs, the result is positive where both graphs are either both positive or both negative, and the result is negative where the two graphs have different signs. Where therefore is a quotient graph positive and where is it negative? If you divide a y value by a number whose magnitude is greater than 1, will the resulting y value be closer to of further from the x axis than before? If you divide a y value by a positive number, is the result on the same side of the x axis as before, is it on the opposite side, or does the answer depend on whether the original y value is positive or negative? Where is the magnitude of the y value of the 'blue' graph greater than 1, and where is it less than 1? If you divide y values of the the 'black' graph by the corresponding y values of the 'blue' graph, where will the resulting graph be closer to the x axis than those of the 'black' graph, and where will they be further? *@ #*&! " Self-critique (if necessary): ------------------------------------------------ Self-critique rating: #*&!
I'll be glad to do that, but first you need to try to independently answer as many of the following questions posed i as you possibly can. Without identifying the specific properties of the graph, you won't be in a position to understand the explanation. Where is the 'blue' graph positive, and where is it negative? Where is the 'black' graph positive, and where is it negative? If you multiply or divide the two graphs, the result is positive where both graphs are either both positive or both negative, and the result is negative where the two graphs have different signs. Where therefore is a quotient graph positive and where is it negative? If you divide a y value by a number whose magnitude is greater than 1, will the resulting y value be closer to of further from the x axis than before? If you divide a y value by a positive number, is the result on the same side of the x axis as before, is it on the opposite side, or does the answer depend on whether the original y value is positive or negative? Where is the magnitude of the y value of the 'blue' graph greater than 1, and where is it less than 1? If you divide y values of the the 'black' graph by the corresponding y values of the 'blue' graph, where will the resulting graph be closer to the x axis than those of the 'black' graph, and where will they be further? *@ #*&!#*&!
I'll be glad to do that, but first you need to try to independently answer as many of the following questions posed i as you possibly can. Without identifying the specific properties of the graph, you won't be in a position to understand the explanation. Where is the 'blue' graph positive, and where is it negative? Where is the 'black' graph positive, and where is it negative? If you multiply or divide the two graphs, the result is positive where both graphs are either both positive or both negative, and the result is negative where the two graphs have different signs. Where therefore is a quotient graph positive and where is it negative? If you divide a y value by a number whose magnitude is greater than 1, will the resulting y value be closer to of further from the x axis than before? If you divide a y value by a positive number, is the result on the same side of the x axis as before, is it on the opposite side, or does the answer depend on whether the original y value is positive or negative? Where is the magnitude of the y value of the 'blue' graph greater than 1, and where is it less than 1? If you divide y values of the the 'black' graph by the corresponding y values of the 'blue' graph, where will the resulting graph be closer to the x axis than those of the 'black' graph, and where will they be further? *@