Question
Amaya made 10 three point shots out of 25 attempts. If she then goes on to make consecutive three point shots, her success would be given by the function![f left parenthesis x right parenthesis equals fraction numerator x plus 10 over denominator x plus 25 end fraction](data:image/png;base64,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)
Hint:
A rational function is a function that is the ratio of polynomials. Any function of one variable, x, is called a rational function if, it can be represented as f(x) = p(x)/q(x), where p(x) and q(x) are polynomials such that q(x) ≠ 0.
Rational functions are of the form y=f(x)y=fx , where f(x)fx is a rational expression.
- If both the polynomials have the same degree, divide the coefficients of the leading terms. This is your asymptote.
- If the degree of the numerator is less than the denominator, then the asymptote is located at y = 0 (which is the x-axis).
- If the degree of the numerator is greater than the denominator, then there is no horizontal asymptote.
The correct answer is: The vertical asymptote of the rational function is x=-25 .We will find more points on the function and graph the function.
1.Find the asymptotes of the rational function, if any.
2.Draw the asymptotes as dotted lines.
3.Find the x -intercept (s) and y -intercept of the rational function, if any.
4.Find the values of y for several different values of x .
5.Plot the points and draw a smooth curve to connect the points. Make sure that the graph does not cross the vertical asymptotes.
The vertical asymptote of a rational function is x -value where the denominator of the function is zero. Equate the denominator to zero and find the value of x .
x + 25= 0
x = -25
The vertical asymptote of the rational function is x=-25 .We will find more points on the function and graph the function.
x
y
-30
4
-26
16
-40
2
X
Y
-21
-2.75
-10
0
-24
-14
![](data:image/png;base64,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)
From the graph we can analyze that the vertical asymptote of the rational function is x= -25 and horizontal asymptote is
y = (leading coefficient of numerator) / (leading coefficient of the denominator) = 1/1=1
Related Questions to study
Which function has a graph with a horizontal asymptote at y = -1.
![text a. end text straight F left parenthesis straight x right parenthesis equals fraction numerator x plus 5 over denominator x minus 3 end fraction](data:image/png;base64,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)
Which function has a graph with a horizontal asymptote at y = -1.
![text a. end text straight F left parenthesis straight x right parenthesis equals fraction numerator x plus 5 over denominator x minus 3 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x =a or y = b
![straight F left parenthesis straight x right parenthesis equals fraction numerator 6 x squared minus 12 x over denominator x squared plus 5 x minus 24 end fraction](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJQAAAAqCAYAAABV/HLRAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAbSkFbcgAABAhJREFUeNrtXEFIFVEUfUiIRAQiEuFCkJCIECEkIqSNiISrIEIkIgQJkYj2LaKNuJAWbaJli0BCQkSCcBEiIUhEi5DAZdsWEiEf4Xcv/4wMvzfvzfx5b+aNcw8c8P+Z/33vzpl777tv7ldK4AJNsEHcIV4SkwhcoIu4QPwqphC4xJGYQOAKt4ifxQz1wxhxlXgIj7IOMeTBReRQQx7HPUx8RvyWcPwm8T3m1cB5s3K5/WIeAhrG6/Mw+nbOC70BUfnEW4y/mXCcveMM8RxeX4HIZ+Sy+wEbeM/xd7KINiHMIleWaTFI/C6X3g9eZ7hb54hLmvdf4FgEFtPlEkoVeRcKaecnMGA/Y1jiEsCF2OuHxFeai9vOkAR1A2Gv0/kJLHcq5ztrxL9IXPcMiesUcQV/TxC3AplHWkH1EHeRrFdpfpVBE3flbeIZ1SpGsrF/qlZRUodPWAHyiqnPwf+30ZWgeokfiJOW81zOr3bg5fSA5v1R4q+EzzyBJxsJ7MYwYQhiSrMNFOL8KoNNeCUdGpr3orrOSmBLb5OgeIHwhng2xfeUPr+FhJVBEpYMoaSs8d9LuAi7mrt8HRfmHHKtvsAFxQn2KsK5DaXPj13ilw4+txOQO+1WreLfXMzo11GnmYid1w9vFjfwtGoVFkMW1EbKEob3+aVJEHeQa2TFNZWvCu0a/QgJf4jHENh4m+jWEnKtd1gZlSkk0zVKk+wXMj9bkjdqqGWkwTaEJajRctqEZeJiju9/nDH3EpxyQX1sCws9yKcGNOFkD8fj4GqtFM1EUCc4ROyN4yoSu/akcDIhGT7MmL8VuZUhKDjZO0743GKsLPDAskpoiJnFQ9kEpVD34NL9gaWO0SjoRhAWTychL8I4xDJvqf9IyBMPdQLeQNTtWHehJDCL/CkJkpSLoFKVDZ6r1jM0jPvEl4Zca1nMLIKKoCtsRg/6x7ECYbVDCpsiqP/AdadoT64HYbBXc94mQlyE0LZe4nmbdPuWiNOwOazLAaXbt0Q8Utm2UJYtq79QIN2+AmeQbl+BM/js9g21rtZpd/G0kpqgEb67fUM1fifdxXzuDxGU2TN12u3brLigdLB1F3OD7FwdBVVEt68PQYXQxXtkCJFbFbxJnMF3t68vD1VmF29Sd3E3PNdgnQXluxs2i6AaSH7ZIz6N5S1ljDsJpu5i9pqLFQ3jThFSty931/BuAf+u074l1GYZt4unNEzdxSMar1VbQfnshs1j1EllrnkV2cVr6y7e1RyrpaB8d8PmNepRSeOOI013sTyjporphs1jTH4O/6CkcUfI0l1c5VJIbhTV7ZvWqGtYPXWBUxDTnZLGHSFtd3GtBRVit+9d1fqZIH4e/ze8wlgA484Txozn/AOgVsg6/ICPtQAAAXB0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWkgbWF0aHZhcmlhbnQ9Im5vcm1hbCI+RjwvbWk+PG1vPig8L21vPjxtaSBtYXRodmFyaWFudD0ibm9ybWFsIj54PC9taT48bW8+KTwvbW8+PG1vPj08L21vPjxtZnJhYz48bXJvdz48bW4+NjwvbW4+PG1zdXA+PG1pPng8L21pPjxtbj4yPC9tbj48L21zdXA+PG1vPiYjeDIyMTI7PC9tbz48bW4+MTI8L21uPjxtaT54PC9taT48L21yb3c+PG1yb3c+PG1zdXA+PG1pPng8L21pPjxtbj4yPC9tbj48L21zdXA+PG1vPis8L21vPjxtbj41PC9tbj48bWk+eDwvbWk+PG1vPiYjeDIyMTI7PC9tbz48bW4+MjQ8L21uPjwvbXJvdz48L21mcmFjPjwvbWF0aD67m61pAAAAAElFTkSuQmCC)
Graph the function, labelling all horizontal or vertical asymptotes of the form x =a or y = b
![straight F left parenthesis straight x right parenthesis equals fraction numerator 6 x squared minus 12 x over denominator x squared plus 5 x minus 24 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![F left parenthesis x right parenthesis equals fraction numerator x squared plus x minus 2 over denominator 2 x squared minus 9 x minus 18 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![F left parenthesis x right parenthesis equals fraction numerator x squared plus x minus 2 over denominator 2 x squared minus 9 x minus 18 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![straight F left parenthesis straight x right parenthesis equals fraction numerator 2 x minus 1 over denominator x squared minus 3 x minus 10 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![straight F left parenthesis straight x right parenthesis equals fraction numerator 2 x minus 1 over denominator x squared minus 3 x minus 10 end fraction](data:image/png;base64,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)
Graph the function
![fraction numerator 3 x over denominator x minus 1 end fraction](data:image/png;base64,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)
Graph the function
![fraction numerator 3 x over denominator x minus 1 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![F left parenthesis x right parenthesis equals fraction numerator x plus 4 over denominator 2 x squared minus 13 x minus 7 end fraction](data:image/png;base64,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)
Graph the function, labelling all horizontal or vertical asymptotes of the form x = a or y = b
![F left parenthesis x right parenthesis equals fraction numerator x plus 4 over denominator 2 x squared minus 13 x minus 7 end fraction](data:image/png;base64,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)
Graph each function
![straight F left parenthesis straight x right parenthesis equals fraction numerator negative 1 over denominator straight x plus 3 end fraction](data:image/png;base64,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)
Graph each function
![straight F left parenthesis straight x right parenthesis equals fraction numerator negative 1 over denominator straight x plus 3 end fraction](data:image/png;base64,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)
An owner tracks her sales each day since opening her marketing company. The daily sales, in dollars, after day x is given by the function
. On Approximately which day will the daily sales be
?
![](data:image/png;base64,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)
An owner tracks her sales each day since opening her marketing company. The daily sales, in dollars, after day x is given by the function
. On Approximately which day will the daily sales be
?
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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 5 x squared minus 19 x minus 4 over denominator 2 x squared minus 2 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 5 x squared minus 19 x minus 4 over denominator 2 x squared minus 2 end fraction](data:image/png;base64,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)
Graph the function
![F left parenthesis x right parenthesis equals fraction numerator 2 x minus 3 over denominator 3 x plus 4 end fraction](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGgAAAAjCAYAAAB4g08OAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAuJJREFUeNrtmr1LHEEYxgcRkWATJFikEOQKSXEcWIgcIoEQRCxEsAgWQQJBRIJdyhRpjhQSQpqQIoWIICIiIRxIEJHjCIhIiiDX+B9YHBKWQ7g8g29gPWdn52N3z7uZB37g7ec4786+H/sy1p0qgh1QBw1wBhbvwbiegh/gLwhADXwEg8wxHYEXYIB+PwEV2tZOHYJ50BfaVgBl5sWGwe97Ora6N8+NAsG2V6Ak2P6e9qWtEXDuTcPYBL3mRDoFQ6HfS+BzyuMZovtwPzTjunH6wS8KHkSaBuv09zPwM8WxNFtYc904D8EeeB5z3AGYoohvUHOSRaiMa44enClXjTNCxskpHLtGIXk+4zEOkJGc0yj4Ch5o5E3rbQrFg6QvuBIR+chUovOyEHfA26BXcZXtkyH503ySceKYp0Ah0QtWDc+tZPQK+U4rKE6PKLMPG2QWbKSYQC/Qg9NDlYUL8FJ3ubU6vAZd8P8kFwwHOAaOMzCQivPm2fwueCw4f4siu6Q1SQ9PQBzSA6GsHEUxUSpIcglVHZOhvAzEw75Nyf4PYNXyHm8M/JcX6R14K9lfpmVqUy6ZSDkR7Gpt0yqKUp3drsSalEv6WHRxMIkEsKtVE0xI2IleS87VKZc0/FrQF4/SrmKOuU6oXJKGgZpdxh2NK/gG2StOtVziX3GG4iWObworpGhZLvFBgqE+sfgPVFFhtk65ZJWu46UpnlXHfTgSJaq65RKfqBrqkt182IpTNeRjdMslWZV6nFYnFEs7pb1pNq3AZ9mgXMP9zuuM/vFOaG/ivvqPT77vpglpyGSSv1BQ5g0UijRF7U1JtF3pTnIxlGo4byCV9ibbtiudSeavXd5AOey6gXTam2zbrnQmudSSSzq/glTbm7Jou8oL8kjvg0JRk6y9yabtSnWS+f1z3kDRCiRO26btqqlxnC8ES14vtYjozrbtymZynTSMantTUm1X3kCaUmlvakfblbaB/gFpqSUGvVeq0wAAAPF0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWk+RjwvbWk+PG1vPig8L21vPjxtaT54PC9taT48bW8+KTwvbW8+PG1vPj08L21vPjxtZnJhYz48bXJvdz48bW4+MjwvbW4+PG1pPng8L21pPjxtbz4mI3gyMjEyOzwvbW8+PG1uPjM8L21uPjwvbXJvdz48bXJvdz48bW4+MzwvbW4+PG1pPng8L21pPjxtbz4rPC9tbz48bW4+NDwvbW4+PC9tcm93PjwvbWZyYWM+PC9tYXRoPjJKHJIAAAAASUVORK5CYII=)
Graph the function
![F left parenthesis x right parenthesis equals fraction numerator 2 x minus 3 over denominator 3 x plus 4 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 4 straight x plus 3 over denominator straight x squared minus 4 end fraction](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGUAAAAmCAYAAADdsFUNAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAo1JREFUeNrtWj1LA0EUPESCRRBERMRCkCAWEgJiISGIjYWkEMFKREQQCSL+BTuxEFtrO2uRgIiISBDEwkJEEP9DCgkhEGfhFeeRmN27t5tNdgcGwiW5vdu593kvCPobRbDZ5WtYBm/AH7AGfoLn4GjgINLguwWi3IPrYCp0LAeWXRTlAtzVKErS81ZdEyQP3rXZvCGwAk5Gjo+BL/S9blGmwQ+XBBFu4g2c+mfz5sjPh3ENrmi2lHFwh+LKqkuinIAHEpsnflOiz9vgpUb31YzwyCVBsuCTwuZdgUvgl0Q21JRgJ4yAa+AzresExM1mFEQpgHVwz3CgT9O1OgGVJ3kAfAQ3KZ6Yzr5qnDdeIr+t4uNLXRaqFY4p6ApsUUFnSpQsBXs2n12J8b8n+q8toixQPAnjjMThFuUB3AAHyTpFhf9NyUVs049ubi7GxsyTq7BBFFGH3FLQjUKkyYvM6xfIPdaIosIvcimfa5HZqOCRxPFgNMfTSP6vikPFWOQhIUqZTDFuu2Ix1PrwYBKlGvztdKq2K1JB+yYcR2HmTI4fRoOhXVH3zz6vpTQY2hV1Qw9Tr5LFfam0K7z70mApIrfPtzgu267wgd5gSizbrjigc3gwitKqeFRpV/jiUYMoAdUl2Rjtim62WTolCHV62DK9KlwvNiQ7YYBS+tdetqh9xXbJaRDvJZJp1AIPqyBqrAe/DfZggtzrtIG1bJjYtB4zVFtNGFjLlolN6y1EZInDhtbTPbFpLVReJwhBZg1d138Tm05A9nWCqf6azMSmE0g6/cgJ2YlNJ6Ay/Shb/at2sVUnNvseSaYfuaA6sdnXSDr9yAX/jiiEpNOPuoVyDhzTj14U5jrF5PSjFlF+AVrLH2hChNqAAAABUnRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtaSBtYXRodmFyaWFudD0ibm9ybWFsIj5GPC9taT48bW8+KDwvbW8+PG1pIG1hdGh2YXJpYW50PSJub3JtYWwiPng8L21pPjxtbz4pPC9tbz48bW8+PTwvbW8+PG1mcmFjPjxtcm93Pjxtbj40PC9tbj48bWkgbWF0aHZhcmlhbnQ9Im5vcm1hbCI+eDwvbWk+PG1vPis8L21vPjxtbj4zPC9tbj48L21yb3c+PG1yb3c+PG1zdXA+PG1pIG1hdGh2YXJpYW50PSJub3JtYWwiPng8L21pPjxtbj4yPC9tbj48L21zdXA+PG1vPiYjeDIyMTI7PC9tbz48bW4+NDwvbW4+PC9tcm93PjwvbWZyYWM+PC9tYXRoPlpPhpEAAAAASUVORK5CYII=)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 4 straight x plus 3 over denominator straight x squared minus 4 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 5 x plus 6 over denominator x squared minus 9 x plus 18 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 5 x plus 6 over denominator x squared minus 9 x plus 18 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 3 straight x squared over denominator 4 straight x squared minus 1 end fraction](data:image/png;base64,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)
Identify the vertical and horizontal asymptotes of each rational function.
![straight F left parenthesis straight x right parenthesis equals fraction numerator 3 straight x squared over denominator 4 straight x squared minus 1 end fraction](data:image/png;base64,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)
The graphs of
and
are parallel lines. What is the value of ?
When two lines have distinct y-intercepts but the same slope, they are said to be parallel. They are perpendicular if the slopes of two lines are negative reciprocals of one another.
Parallel-Line: Two or more lines present in the same plane but never crossing each other are said to be parallel lines. They don't have anything in common.
Perpendicular-Line: Perpendicular lines are two lines that meet at an intersection point, which form 4 right angles.
Slope: The slope of a line indicates how sharp it is and is calculated by dividing the distance that a point on the line must travel horizontally and vertically to reach another point. Y-Intercept: Y-Intercept is the point at which the graph crosses the y-axis. From the Given Equation, the parallel lines can be written as 3x-9y=15 and y=mx-4. If the corresponding angles are equal, the two lines are considered parallel.
The graphs of
and
are parallel lines. What is the value of ?
When two lines have distinct y-intercepts but the same slope, they are said to be parallel. They are perpendicular if the slopes of two lines are negative reciprocals of one another.
Parallel-Line: Two or more lines present in the same plane but never crossing each other are said to be parallel lines. They don't have anything in common.
Perpendicular-Line: Perpendicular lines are two lines that meet at an intersection point, which form 4 right angles.
Slope: The slope of a line indicates how sharp it is and is calculated by dividing the distance that a point on the line must travel horizontally and vertically to reach another point. Y-Intercept: Y-Intercept is the point at which the graph crosses the y-axis. From the Given Equation, the parallel lines can be written as 3x-9y=15 and y=mx-4. If the corresponding angles are equal, the two lines are considered parallel.