I really don't know where to go with this. I just need help with it fast. because idk what I'm doing I'm giving max points.
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a... slope
b... interception on the line y
you get the equation y=-1/2 *x + 12
This is what i would put Because they have given you slope and y intercept .
Equation of line format
Y=mx+b
Where slope is "m" : -1/2
Where Y-intercept is "b": 12
Therefore,
Y= -1/2x+12
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counterclockwise around
the origin in order to line
up with Figure B?
A. 90
C. 270
B. 180
D. 360
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Answer:
180
Step-by-step explanation:
180 is half, so that would mean it would be on the opposite side of the figure.
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85m/ 4s = 21.25 m/s
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Answer: 7
Step-by-step explanation:
See attached picture
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'of' means 'times'.
The problem is (0.15) x (63.2) .
I think you can take over and do it from here.
There's your answer
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What makes a NUMBER rational is the ability to have a perfect square root, cube root, or have these components: Perfect square/cube, whole number, repeating (pattern) decimal, termination decimal, and I think one more that I can't remember.
The properties of the rational exponents are given and a rational equation is of the form b = aˣ
What are the laws of exponents?
When you raise a quotient to a power you raise both the numerator and the denominator to the power. When you raise a number to a zero power you'll always get 1. Negative exponents are the reciprocals of the positive exponents.
The different Laws of exponents are:
mᵃ×mᵇ = mᵃ⁺ᵇ
mᵃ / mᵇ = mᵃ⁻ᵇ
( mᵃ )ᵇ = mᵃᵇ
mᵃ / nᵃ = ( m / n )ᵃ
m⁰ = 1
m⁻ᵃ = ( 1 / mᵃ )
Given data ,
Let the rational exponent equation be A
Now , the properties of the exponent equations are
mᵃ×mᵇ = mᵃ⁺ᵇ
The powers of the exponents are added together
mᵃ / mᵇ = mᵃ⁻ᵇ
The powers of the exponents are subtracted together
( mᵃ )ᵇ = mᵃᵇ
The powers of the exponents are multiplied together
mᵃ / nᵃ = ( m / n )ᵃ
m⁰ = 1
Any number raised to the power of 0 is 1
m⁻ᵃ = ( 1 / mᵃ )
Hence , the exponents are solved
PLEASE GIVE BRAINLIEST
Final answer:
Rational exponents have properties that help to simplify expressions and solve mathematical problems. These properties include the product rule, the quotient rule, and the power rule. Utilizing these rules, especially in scientific notation, helps provide concise computations for very large or small numbers.
Explanation:
Properties of Rational Exponents
The properties of rational exponents play a key role in simplifying expressions and solving mathematical problems. Here are three key properties:
- Product Rule: When you multiply two numbers with the same base, you should add the exponents. This is expressed as: a^m * a^n = a^(m+n).
- Quotient Rule: When you divide two numbers with the same base, you should subtract the exponents. This rule is reflected in: a^m / a^n = a^(m-n).
- Power Rule: When you raise a power to a power, you should multiply the exponents: (a^m)^n=a^(mn).
These properties are crucial for solving problems. For example, scientific notation, which is used to represent very large or small numbers, employs these properties of exponents. In scientific notation, numbers are expressed as a product of a digit term and an exponential term. This method is useful for making computations convenient and precise.
Learn more about Rational Exponents here:
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