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What is the answer to.... k plus 3 equals -3?
If: k+3=-3 Then: k=-3-3 k=-6
9x2 - 6x plus k equals 0?
k = -3; factors are (9x + 3)(x - 1)
When k is Eliminated in the system 5j-k equals 17j plus 3k equals 3 what values of j and k will satisfy the system?
j=-3 and k=2
What is 3 plus the product of 14 and k?
As an algebraic expression it is: 3+14k
What are you compared to mathematical symbol?
c-a=k
What is the answer to.... k plus 3 equals -3?
If: k+3=-3 Then: k=-3-3 k=-6
How many like terms are in the expression fourteen k plus 3 j minus 8 h minus 3 k plus 3 plus h k 2?
One triplet (k) and two pairs (h and number). 3j has no like term.
What is the factor of k plus 5k?
k + 5k = 6k 2 x 3 x k
3K-1 equals K plus 2?
3k-1=k+2 2k=3 k=3/2=1.5
9x2 - 6x plus k equals 0?
k = -3; factors are (9x + 3)(x - 1)
When k is Eliminated in the system 5j-k equals 17j plus 3k equals 3 what values of j and k will satisfy the system?
j=-3 and k=2
What has the author K F Riley written?
K. F. Riley has written: 'Mathematical methods for physics and engineering' -- subject(s): Mathematical analysis, Mathematical physics, Engineering mathematics
What is 3 plus the product of 14 and k?
As an algebraic expression it is: 3+14k
What are you compared to mathematical symbol?
c-a=k
If k over 3 plus k over 4 equals 1 what is k?
K/3 + k/4 = 1 LCD=12 *divide lcd by denominator* K(4) + K(3) = 12(1) 4k + 3k = 12 7k = 12 k=12/7
What is mathematical induction?
Mathematical Induction is a process uses in College Algebra It can be used to prove that a sequence is equal to an equation For Example: 1+3+5+7+n+2=2n+1 there are 3 steps to mathematical induction the first includes proving that the equation is true for n=1 the second includes substituting k for every n-term the third involves substituting k+1 for every k-term to prove that both sides are equal
What are the possible values of k when kx squared plus x squared plus kx plus k plus 1 equals 0 has equal roots?
Taking all terms and conditions into consideration a quadratic equation can be finally formed as such that 3k^2 +8k +4 = 0 whose solutions are k = -2/3 or k = -2 Check: 3(-2/3)^2 +8(-2/3) +4 = 0 Check: 3(-2)^2 +8(-2) +4 = 0
