Answer:
The value of two numbers is x=49 and y=26 and the corresponding equation for the given condition is x +y =75
<u>Explanation:</u>
Given:
Sum of two numbers is 75
One number is 23 more than other
To find:
Frame the equation for the above condition and find the value of two numbers.
Solution:
From the given we know that the sum of two numbers is 75
Let x and y be the numbers, such that the equation is framed as
x +y =75
And we also know that one number is 23 more than other, so we can say either x or y has a greater one
Here I say x is 23 more than y such that,
x=23+y
Substitute the value of x in the equation and we know
x + y=75 and x=23+y we get,
23+y+y=75
23+2y=75
2y=75-23
2y=52
y=26
Since x=23+y as already stated we get as
x=23+26=49
Result:
Thus the equation for the above given conditions is x +y =75 and the values of two number is 49 and 26
Answer:
C. 80in
Step-by-step explanation:
Hope this Helped
<span>12.5% of 64=8 Would be the answer to this.</span>
Answer:
To create function h, function f was translated 2 units right
, translated 4 units up and reflected across the x axis
Step-by-step explanation:
Given
Required
Complete chart
First: f(x) was translated right by 2 units
The rule of right translation is 
So, we have:
Next: f'(x) was translated up by 4 units
The rule of down translation is 
So, we have:
Lastly, f"(x) was reflected across the x-axis;
The rule of this reflection is: 
So, we have:
![h(x) = -[(x+2)^3 + 4]](https://tex.z-dn.net/?f=h%28x%29%20%3D%20-%5B%28x%2B2%29%5E3%20%2B%204%5D)
Remove bracket
