The quadratic equation with roots 1/α and 1/β is
<u>Solution:</u>
Given, roots of equation
We have to find equation whose roots are 1/α, and 1/β.
We know that,
Now, we know that, general form of an equation is
Then, equation whose roots 1/α and 1/β is
from above given equation,
Answer:
<h3> __</h3><h3>0.63</h3>
Step-by-step explanation:
7/11 = no, add 0
70/11 = 6, so 0.6, remainder is 4, add 0
40/11 = 3, so 0.03, remainder is 7, add 0
70/11 = 6... and it goes on
<h3>The answer is 0.63 bar notation on both 6 and 3</h3>
Answer:
The discriminant is 0
Step-by-step explanation:
If b² - 4ac = 0 then the roots are real and equal
Since there is only one x- intercept then this condition applies
The equation is y = -2x + 120
Since the numbers are going down there is a negative slope.
Substitute 40 in and you will get 40 as your answer.