Clockwise rotation 90 ° about origin
R_{90, clockwise, origin}(x,y) -> (y,-x)
J(-4,1) therefore
R_{90, clockwise, origin}J(-4,1) -> J'(1,+4)
THIS LINK HAS YOUR ANSWER ALREADY:: brainly.com/question/10694876
I have no Idea what you are saying sorry
Answer:
25
Step-by-step explanation:
36-1*16+5 (PEMDAS, exponents first)
36-16+5 (PEMDAS, multiplication)
20+5 (PEMDAS, add and subtract left to right)
25 (PEMDAS, add and subtract left to right)
he polynomial x(5x² + 10x + 15), it is not completely factored, 5x² + 10x + 15 can still be factored into two binomials.
<h3>
Polynomial</h3>
Polynomial is an expression that involves only the operations of <em>addition, subtraction, multiplication </em>of variables.
Given the polynomial x(5x²+10x+15), it is not completely factored, 5x²+10x+15 can still be factored,
Find out more on Polynomial at: brainly.com/question/2833285
Answer: I believe the answer to your question is 4
Step-by-step explanation:
