Can 3/42 be simplified?
Answers
Divide the top and bottom number by 3
3/3 1
42/3 14
I hope this helps;)
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I need help I’m not sure
Answers
(This is a simpler form of the question because the question is just asking how many shapes of a rectangle can Jenn create with 18 blocks)
So, the numbers that multiply up to 18 are:
1 x 18
2 x 9
3 x 6
So, the answer is: Jenn can make the model of the park in 3 different ways.
Answers
There's actually no such thing as "the formula for a triangle".
There are many details of a triangle that you might be asked
to calculate. You might be asked to find the perimeter, the area,
the angles, or the length of one or more sides. Your question
doesn't specify which of these things we're expected to find.
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Step 1 : Note down the given ratio from the questions.
Step 2 : Find the greatest common factor, and divide the numerator and denominator by that value.
Answer: 3:7
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Answer:
(k4+3+3k3)+(-5k3+6k3+8k5)
Final result :
8k5 + k4 + 4k3 + 3
Step by step solution :
Step 1 :
Equation at the end of step 1 :
(((k4)+3)+(3•(k3)))+(((0-(5•(k3)))+(6•(k3)))+23k5)
Step 2 :
Equation at the end of step 2 :
(((k4)+3)+(3•(k3)))+(((0-(5•(k3)))+(2•3k3))+23k5)
Step 3 :
Equation at the end of step 3 :
(((k4)+3)+(3•(k3)))+(((0-5k3)+(2•3k3))+23k5)
Step 4 :
Equation at the end of step 4 :
(((k4) + 3) + 3k3) + (8k5 + k3)
Step 5 :
Checking for a perfect cube :
5.1 8k5+k4+4k3+3 is not a perfect cube
Trying to factor by pulling out :
5.2 Factoring: 8k5+k4+4k3+3
Thoughtfully split the expression at hand into groups, each group having two terms :
Group 1: k4+3
Group 2: 8k5+4k3
Pull out from each group separately :
Group 1: (k4+3) • (1)
Group 2: (2k2+1) • (4k3)
Bad news !! Factoring by pulling out fails :
The groups have no common factor and can not be added up to form a multiplication.
Polynomial Roots Calculator :
5.3 Find roots (zeroes) of : F(k) = 8k5+k4+4k3+3
Polynomial Roots Calculator is a set of methods aimed at finding values of k for which F(k)=0
Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers k which can be expressed as the quotient of two integers
The Rational Root Theorem states that if a polynomial zeroes for a rational number P/Q then P is a factor of the Trailing Constant and Q is a factor of the Leading Coefficient
In this case, the Leading Coefficient is 8 and the Trailing Constant is 3.
The factor(s) are:
of the Leading Coefficient : 1,2 ,4 ,8
of the Trailing Constant : 1 ,3
Let us test ....
P Q P/Q F(P/Q) Divisor
-1 1 -1.00 -8.00
-1 2 -0.50 2.31
-1 4 -0.25 2.93
-1 8 -0.13 2.99
-3 1 -3.00 -1968.00
-3 2 -1.50 -66.19
-3 4 -0.75 -0.27
-3 8 -0.38 2.75
1 1 1.00 16.00
1 2 0.50 3.81
1 4 0.25 3.07
1 8 0.13 3.01
3 1 3.00 2136.00
3 2 1.50 82.31
3 4 0.75 6.90
3 8 0.38 3.29
Polynomial Roots Calculator found no rational roots
Final result :
8k5 + k4 + 4k3 + 3
Step-by-step explanation: