Answer :
1. isn't an exponential function
2. growths
3. growths
4. decay
5. growths
The exponential operations have the subsequent formula: y = K1 × [tex]K2^{(k3*t)}[/tex], where K3, K2, and K1 are constants and K2 is more distinguished than zero.
Exponential operation graphs either decrease or always increase.
To determine whether the operation increases or declines, just consider it at two points, for example, t = 0 and t = 1, and compare the consequences.
1. y = 100 × [tex](1 - 12)^x[/tex] = 100 × [tex](-11)^x[/tex]
Because (-11) is a negative number, y is not an exponential function.
2. y(0) = 0.1 × [tex](1.25)^0[/tex] = 0.1
y(1) = 0.1 × (1.25) = 0.125
y(1) > y(0) → growths
3. y(0) =((1−0.03) × 12)² × (0) = 1
y(0) =((1 − 0.03) × 12)²= 135.4896
y(1) > y(0) → growths
4. y(0) = 426 × [tex](0.98)^0[/tex] = 426
y(1) = 426 × [tex](0.98)^1[/tex] = 417.48
y(1) < y(0) → decay
5. y(0) = 2050 × [tex](12)^{0}[/tex] = 2050
y(1) = 2050 × 12 = 24600
y(1) > y(0) → growths
To learn more about the exponential growth at
https://brainly.com/question/6593909?referrer=searchResults
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The question is -
Does each function describe exponential growth or decay?
Drag and drop the equations into the boxes to correctly complete the table.
Growth Decay
- y=100(1−12)^t
- y=0.1(1.25)^t
- y=((1−0.03)12)^2t
- y=426(0.98)^t
- y=2050(12)^t
