Well first we need to do whatever is in the parentheses, which in this case is: (5x1/20)
Following the order of operations (PEMDAS) we start with the multiplication, which is (5x1). We know that 5x1=5, so now we can move on to the division:
5/20, which is equal to 0.25
So now that we know the answer to the equation in the parentheses is 0.25, we can solve the whole equation.
Here is the equation simplified:
4 (0.25)
Because there is now operation indicated between the 4 and the parentheses, we can assume that multiplication is implied, so the final equation is as follows:
4x0.25=1
The final answer is: 1
Hope this helps!
Answer:
Its equal to
Step-by-step explanation:
Answer:
Jerry will have two apples only
4-2=2
The future value annuity is given by:
FV=P[(1+r)^n-1]/r
where:
P=principle=$650
r=rate=0.12/4=0.03
t= time=5×4=20
Hence our future value annuity will be:
FV=650[(1+0.03)^20-1]/0.03
FV=650×0.80611/0.03
FV=650×26.870375
FV=$17,465.75
The answer is $17,465.75
The slope and intercept form of the equation of a straight line graph is
False: <em>Graphs of two lines either </em><em>intersect </em><em>in one point or do not </em><em>intersect</em><em>. Thus graphs of </em><em>two lines</em><em> may have one point or no points in common</em>
False: <em>Graphs of two </em><em>lines </em><em>either intersect in one point or overlap. Thus graphs of two lines may have one point or an </em><em>infinite </em><em>number of </em><em>points </em><em>in common</em>
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Reason:
First statement;
<em>Graphs of two lines either intersect in one point or do not intersect. Thus graphs of two lines may have one point or no points in common</em>
The above statement is false; graphs of two lines may have an infinite number of points in common when they have the same slope and y-intercept
Second statement;
<em>Graphs of two lines either intersect in one point or overlap. Thus graphs of two lines may have one point or an </em><em>infinite </em><em>number of points in common </em>
The above statement is false; graphs of two lines that have the same slope but different y-intercept never intersect
Learn more about the number of solution of straight line graphs here:
brainly.com/question/21865476