The computation shows that the values of Δy and dy will be 0.572 and 0.4 respectively.
<h3>How to compute the values?</h3>
The value of Δy will be computed thus:
Δy = y(x + Δx) - y(x)
= y(1.1) - y(1)
= 0.5(1.1)⁸ - 0.5(1)⁸
= 0.572
The value of dy will be:
= y'(x)dx
= (0.5)⁸ × x⁷(0.1)
= 0.4 (1)⁷
= 0.4
Learn more about finding values on:
brainly.com/question/25927269
Answer:
When we multiply two number with the same base but different power, the power gets added.
So, the answer is:
5^17*5^2
=5^(17+2)
=5^19
Answer:
The vaues to the given equations are x=-2 and y=-4
Therefore the solution set is (-2,-4)
Step-by-step explanation:
Given equations are
To solve the given equation to find the solution set :
Multiply the equation (1) into 2 we get
Multiply the equation (2) into 3 we get
Now adding the equations (3) and (4) we get
________________
Therefore y=-4
Substitute the value of y=-4 in the equation (1) we get
3x-12=-18
3x-12+12=-18+12
3x=-6
Therefore x=-2
The vaues to the given equations are x=-2 and y=-4
Therefore the solution set is (-2,-4)
Copied and pasted from a page about Bernoulli trials. I think it's safe to assume the properties are the same because a binomial experiment is a sequence of Bernoulli trials. (but I'm not an expert)
There are only two outcomes a 1 or 0, i.e., success or failure each time.
If the probability of success is p then the probability of failure is 1-p and this remains the same across each successive trial.
The probabilites are not affected by the outcomes of other trials which means the trials are independent.
Answer:
We can't see it all that well sorry.
Step-by-step explanation: