To solve this, we can use the angle addition formula for cosine: cos(a+b) = cos(a)cos(b) - sin(a)sin(b).
This simplifies the expression to: -2(sin(32)*cos(32))/(cos(26))
Now we can plug in the values and calculate the expression:
-2(sin(32)cos(32))/(cos(26)) = -2((0.5299)(0.8532))/(0.8979)= -2(0.4520) / 0.8979= -0.9040 / 0.8979= -1.006
Therefore, -2sin(32)cos(32) / cos(26) is equal to approximately -1.006.
To solve this, we can use the angle addition formula for cosine: cos(a+b) = cos(a)cos(b) - sin(a)sin(b).
This simplifies the expression to: -2(sin(32)*cos(32))/(cos(26))
Now we can plug in the values and calculate the expression:
-2(sin(32)cos(32))/(cos(26)) = -2((0.5299)(0.8532))/(0.8979)
= -2(0.4520) / 0.8979
= -0.9040 / 0.8979
= -1.006
Therefore, -2sin(32)cos(32) / cos(26) is equal to approximately -1.006.