Answer:
Step-by-step explanation:
How do you find the LCM of 7 and 12?
What is the LCM of 12 and 7?
Find the prime factorization of 12.
Find the prime factorization of 7. 7 = 7.
LCM = 2 × 2 × 3 × 7.
LCM = 84.
If you just mean the product of the prime factors of 39 then this is the answer
39 = 3 x 13
Answer:
let's divide the figure into two parts.
radius of the semicircle is 3.5m. two semi-circles make a circle and
area of circle=pi×r²
area of circle=22/7×(3.5m)2².
area of circle=38.5m²
area of rectangle=length ×width
area of rectangle =18m×7m
area of rectangle =126m²
area pf figure =38.5m²+126m²
area of figure=164.5m²
The expression for which you want to find an equivalent form is:
Answer:
Here there are 3 equivalent expressions:
Explanation:
There are many equivalent forms that you can find, so I will show some of the most important.
The first step that you should do is to put the radicand number (the number inside the root, i.e. 3) as a product of its prime factors. Thus the first equivalent expression is:
Now you can simplify the root index, 4, with the exponent of the radicand, 2, an you get a new equivalent:
Another equivalent form is obtained if you convert the 1/2 index (before the x) into a root index:
The main properties used to find those equivalent expressions are:
And:
the answer would be q=36,-6