JASON'S SALARY AND KAREN'S SALARY WERE EACH P PERCENT GREATER IN 1998 THAN IN 1995. WHAT IS THE VALUE OF P?
1. IN 1995 KAREN'S SALARY WAS 2,000 GREATER THAN JASON'S
2. IN 1998 KAREN'S SALARY WAS 2,400 GREATER THAN JASON'S
GMAT-PREP (DATA SUFF)
This question took me a while to answer. I solved it by writing out the equations as follow:
1. J + 2000 = K -> insufficient.
2. pJ + J + 2440 = pK + K -> insufficient.
However if we subtract step 1 from step 2 then we get:
pJ + 440 = pK. Then we do substitution of K with J.
pJ + 440 = p(J+2000).
pJ + 440 = PJ + p2000.
440 = p2000.
p= 440/2000.
As you can see this took quite a few steps. I'm wondering if there is any cues that i'm missing that would allow me to solve this problem quicker.
1. IN 1995 KAREN'S SALARY WAS 2,000 GREATER THAN JASON'S
2. IN 1998 KAREN'S SALARY WAS 2,400 GREATER THAN JASON'S
GMAT-PREP (DATA SUFF)
This question took me a while to answer. I solved it by writing out the equations as follow:
1. J + 2000 = K -> insufficient.
2. pJ + J + 2440 = pK + K -> insufficient.
However if we subtract step 1 from step 2 then we get:
pJ + 440 = pK. Then we do substitution of K with J.
pJ + 440 = p(J+2000).
pJ + 440 = PJ + p2000.
440 = p2000.
p= 440/2000.
As you can see this took quite a few steps. I'm wondering if there is any cues that i'm missing that would allow me to solve this problem quicker.
