Question
Write the radical
using rational exponents.
- -3
![3 to the power of 5 over 4 end exponent](data:image/png;base64,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)
![5 to the power of 4](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAARCAYAAADQWvz5AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAQ3ZOC+gAAAItJREFUeNpjYCAfRAPxfwYKgQ4QH6XUIEEgPg7E0pQatAaILaFsDIP+48HIoByIY9H0YRhEDCBoGbl+JdtF9DXoFxB/AuJtQFwExDyURC0LEBsDcS0Q3wBiDQYqADcgPshAJfCDGoaA8tNdUjWtgyZ7Jij2gBoSRKpBoUB8C4j/APE7IF4FxKYMAwEAH3EsFQzxnhsAAABgdEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1zdXA+PG1uPjU8L21uPjxtbj40PC9tbj48L21zdXA+PC9tYXRoPqm8qk0AAAAASUVORK5CYII=)
- -6
Hint:
The correct answer is: ![3 to the power of 5 over 4 end exponent](data:image/png;base64,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)
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The value of a if f(x) = a.3x is __________.
![](data:image/png;base64,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)
to find the value of function at certain point just replace the variables with the given points
The value of a if f(x) = a.3x is __________.
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)
to find the value of function at certain point just replace the variables with the given points
Find the domain of the exponential function given.
![](data:image/png;base64,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)
generally for any exponential function the domain is all real numbers
Find the domain of the exponential function given.
![](data:image/png;base64,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)
generally for any exponential function the domain is all real numbers
Solve 2 = ![open parentheses 4 to the power of 1 third end exponent close parentheses open parentheses 2 to the power of x over 3 end exponent close parentheses](data:image/png;base64,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)
Solve 2 = ![open parentheses 4 to the power of 1 third end exponent close parentheses open parentheses 2 to the power of x over 3 end exponent close parentheses](data:image/png;base64,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)
The range of the exponential function f(x) = 5.2x is _________.
for any function f(x) =ax (if a>1) the range of f(x) is (0,infinity)
therefore for f(x)=k.ax the range would be (0*k,infinity*k) that is (0,infinity)
The range of the exponential function f(x) = 5.2x is _________.
for any function f(x) =ax (if a>1) the range of f(x) is (0,infinity)
therefore for f(x)=k.ax the range would be (0*k,infinity*k) that is (0,infinity)
The
power of 2401 is ___________.
The
power of 2401 is ___________.
The total weight of a carton box is
and the weight of each box of chocolates is
. Find the value of x if the carton box is filled with 49 boxes.
ax/ay =ax-y (if base are same then power are subtracted in exponential division)
The total weight of a carton box is
and the weight of each box of chocolates is
. Find the value of x if the carton box is filled with 49 boxes.
ax/ay =ax-y (if base are same then power are subtracted in exponential division)
Find the value of x if
.
Find the value of x if
.
Ratios of y-values |
. |
Ratios of y-values |
. |
Observe the table and answer the following:
x | y |
1 | 3 |
2 | 6 |
3 | 12 |
4 | 24 |
5 | 48 |
6 | 96 |
Observe the table and answer the following:
x | y |
1 | 3 |
2 | 6 |
3 | 12 |
4 | 24 |
5 | 48 |
6 | 96 |
Observe the table and answer the following:
x | y |
1 | 3 |
2 | 6 |
3 | 12 |
4 | 24 |
5 | 48 |
6 | 96 |
Observe the table and answer the following:
x | y |
1 | 3 |
2 | 6 |
3 | 12 |
4 | 24 |
5 | 48 |
6 | 96 |